"filmID","creator","title","date_of_publication","runtime","series_title","summary","format_type","associated_entity","geography","subject_group","genre","image_url","direct_url"
"fod100075262","","Vertical Motion. Calculus-Applications of Integrals: Physics","","9 min 50 sec","['Calculus-Applications of Integrals: Physics']","This example shows how to solve vertical motion problems for time, velocity, and height and different points during the rise and fall of the object.","stream","[]","[]","['Calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_m3oesv16/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75262"
"fod100075261","","Hydrostatic Pressure. Calculus-Applications of Integrals: Physics","","4 min 57 sec","['Calculus-Applications of Integrals: Physics']","Hydrostatic pressure is the pressure exerted on an object by a liquid at rest.","stream","[]","[]","['Calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_pitqc7pa/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75261"
"fod100075260","","Work Done by a Variable Force. Calculus-Applications of Integrals: Work","","4 min 8 sec","['Calculus-Applications of Integrals: Work']","If the work being done isn't consistent, but if instead the force varies, then you can find work done by the variable force using the method from this video.","stream","[]","[]","['Calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_bmnj1qk3/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75260"
"fod100075259","","Work Done to Empty a Tank. Calculus-Applications of Integrals: Work","","18 min 29 sec","['Calculus-Applications of Integrals: Work']","To find the work required to pump water out of a tank, you need to model the work required to pump out a small slice of the water, and then transform that into integral notation in order to find the work required to pump out all the water.","stream","[]","[]","['Calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_rysu9ylg/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75259"
"fod100075258","","Work Done on Elastic Springs. Calculus-Applications of Integrals: Work","","8 min 15 sec","['Calculus-Applications of Integrals: Work']","In this video we'll talk about the work required to stretch and compress elastic springs.","stream","[]","[]","['Calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_ubyvip0q/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75258"
"fod100075257","","Cylindrical Shells, Vertical Axis. Example 2","","10 min 48 sec","['Calculus-Applications of Integrals: Volume of Revolution']","In this example we use cylindrical shells to find volume of revolution around a vertical axis.","stream","[]","[]","['Integrals', 'Curvature', 'Volume (Cubic content)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_agdkmxvt/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75257"
"fod100075256","","Cylindrical Shells, Vertical Axis","","13 min 24 sec","['Calculus-Applications of Integrals: Volume of Revolution']","In this example we use cylindrical shells to find volume of revolution around a vertical axis.","stream","[]","[]","['Integrals', 'Curvature', 'Volume (Cubic content)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_uhmdj0a2/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75256"
"fod100075255","","Washers, Horizontal Axis. Example 2","","8 min 1 sec","['Calculus-Applications of Integrals: Volume of Revolution']","In this example we use washer method to find volume of revolution around a horizontal axis.","stream","[]","[]","['Integrals', 'Curvature', 'Volume (Cubic content)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_x8f6lj41/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75255"
"fod100075254","","Disks, Vertical Axis. Example 2","","6 min 25 sec","['Calculus-Applications of Integrals: Volume of Revolution']","In this example we use disk method to find volume of revolution around a vertical axis.","stream","[]","[]","['Integrals', 'Curvature', 'Volume (Cubic content)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_qh5ax9qu/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75254"
"fod100075253","","Surface of Revolution Equation","","5 min 8 sec","['Calculus-Applications of Integrals: Surface Area of Revolution']","Sometimes you need to find the equation of the figure created by rotating a two-dimensional curve around an axis. More often you'll be asked to find the surface area or the volume of that figure, but if you need to find the equation that represents it, you can use the method in this video.","stream","[]","[]","['Integrals', 'Curvature', 'Surfaces, Algebraic']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_i93560g0/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75253"
"fod100075252","","Surface Area of Revolution","","9 min 34 sec","['Calculus-Applications of Integrals: Surface Area of Revolution']","When you rotate a two-dimensional curve around a linear axis, it creates the outline of a three-dimensional object, for which you can find surface area using surface area of revolution formulas.","stream","[]","[]","['Integrals', 'Curvature', 'Surfaces, Algebraic']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_jvf1lmle/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75252"
"fod100075251","","Arc Length of y f(x). Calculus-Applications of Integrals: Arc Length","","7 min 41 sec","['Calculus-Applications of Integrals: Arc Length']","You can think about the arc length of a curve over an interval as the distance you'd have to walk from the point on the curve at the left edge of the interval to the point on the curve at the right edge of the interval.","stream","[]","[]","['Integrals', 'Curvature']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_jpvrdnyp/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75251"
"fod100075250","","Area Between Upper and Lower Curves","","10 min 29 sec","['Calculus-Applications of Integrals: Area Between Curves']","Given two curves defined for y in terms of x, you can find the area in between them by taking the integral of the difference between the upper curve and the lower curve. Your first step will be to figure out which curve is higher and which curve is lower.","stream","[]","[]","['Integrals', 'Curvature']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_0f7v7nob/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75250"
"fod100075249","","Trigonometric Substitution with Tangent. Calculus-Integrals: Trigonometric Substitution. Example 2","","21 min 36 sec","['Calculus-Integrals: Trigonometric Substitution']","We'll use a tangent substitution in this example to simplify the integral.","stream","[]","[]","['Integrals', 'Substitutions, Linear', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_mqptf9tj/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75249"
"fod100075248","","Trigonometric Substitution with Tangent. Calculus-Integrals: Trigonometric Substitution","","14 min 48 sec","['Calculus-Integrals: Trigonometric Substitution']","We'll use a tangent substitution in this example to simplify the integral.","stream","[]","[]","['Integrals', 'Substitutions, Linear', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_n28l9q00/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75248"
"fod100075247","","Trigonometric Substitution with Sine. Calculus-Integrals: Trigonometric Substitution. Example 2","","14 min 48 sec","['Calculus-Integrals: Trigonometric Substitution']","We'll use a sine substitution in this example to simplify the integral.","stream","[]","[]","['Integrals', 'Substitutions, Linear', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_in6brmlp/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75247"
"fod100075246","","Trigonometric Substitution with Sine. Calculus-Integrals: Trigonometric Substitution","","12 min 21 sec","['Calculus-Integrals: Trigonometric Substitution']","We'll use a sine substitution in this example to simplify the integral.","stream","[]","[]","['Integrals', 'Substitutions, Linear', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_9kb9wj8p/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75246"
"fod100075245","","Trigonometric Substitution Setup. Calculus-Integrals: Trigonometric Substitution","","13 min 12 sec","['Calculus-Integrals: Trigonometric Substitution']","Trigonometric substitution problems are often long and tedious, with lots of important details that you have to pay attention to. It's easier to work through trig sub problems if you have everything you're going to need ahead of time, which is why I like to go through this setup process before I start the main part of the problem.","stream","[]","[]","['Integrals', 'Substitutions, Linear', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_wrvd793z/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75245"
"fod100075244","","Inverse Hyperbolic Integrals. Calculus-Integrals: Hyperbolic Integrals","","3 min 53 sec","['Calculus-Integrals: Hyperbolic Integrals']","The result of some integrals will be inverse hyperbolic functions.","stream","[]","[]","['Integrals', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_sw325xxu/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75244"
"fod100075243","","Hyperbolic Integrals. Calculus-Integrals: Hyperbolic Integrals","","2 min 36 sec","['Calculus-Integrals: Hyperbolic Integrals']","Hyperbolic functions are denoted by the extra ""h"" that's added onto the regular trigonometric function. Integrating these functions is similar to integrating regular trigonometric functions.","stream","[]","[]","['Integrals', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_u8ll49us/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75243"
"fod100075242","","Tan n, even n. Example 2","","5 min 16 sec","['Calculus-Integrals: Trigonometric Integrals']","There's a trick to integrating the product of a higher-degree tangent function and a higher-degree secant function. This is an example in which the power of the secant function is even. To use this method, the power of the tangent function can be even or odd.","stream","[]","[]","['Integrals', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hczpo31e/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75242"
"fod100075241","","Trigonometric Integrals. Calculus-Integrals: Trigonometric Integrals. Example 2","","11 min 7 sec","['Calculus-Integrals: Trigonometric Integrals']","Oftentimes, evaluating the integral of a trigonometric function will be more about using another method for solving integrals, like substitution, integration by parts, or partial fractions, than it is about the trigonometric function itself.","stream","[]","[]","['Integrals', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_xotnj1hu/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75241"
"fod100075240","","Trigonometric Integrals. Calculus-Integrals: Trigonometric Integrals","","3 min 9 sec","['Calculus-Integrals: Trigonometric Integrals']","Oftentimes, evaluating the integral of a trigonometric function will be more about using another method for solving integrals, like substitution, integration by parts, or partial fractions, than it is about the trigonometric function itself.","stream","[]","[]","['Integrals', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_9c52qy6c/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75240"
"fod100075239","","Repeated Quadratic Factors. Calculus-Integrals: Partial Fractions. Example 2","","16 min 40 sec","['Calculus-Integrals: Partial Fractions']","This example shows how to do a partial fraction decomposition with a combination of distinct linear and repeated quadratic factors.","stream","[]","[]","['Integrals', 'Fractional calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_ycvx9ezw/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75239"
"fod100075238","","Repeated Quadratic Factors. Calculus-Integrals: Partial Fractions","","14 min 34 sec","['Calculus-Integrals: Partial Fractions']","This example shows how to do a partial fraction decomposition with a combination of distinct linear and repeated quadratic factors.","stream","[]","[]","['Integrals', 'Fractional calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_t2yim73z/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75238"
"fod100075237","","Repeated Linear Factors. Calculus-Integrals: Partial Fractions","","12 min 37 sec","['Calculus-Integrals: Partial Fractions']","This example shows how to do a partial fractions decomposition with repeated linear factors.","stream","[]","[]","['Integrals', 'Fractional calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_jcha76mb/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75237"
"fod100075236","","Distinct Quadratic Factors. Calculus-Integrals: Partial Fractions. Example 3","","8 min 15 sec","['Calculus-Integrals: Partial Fractions']","This is an example of how to do a partial fractions decomposition when you're dealing with distinct quadratic factors.","stream","[]","[]","['Integrals', 'Fractional calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_p6il3pyl/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75236"
"fod100075235","","Distinct Quadratic Factors. Calculus-Integrals: Partial Fractions. Example 2","","15 min 16 sec","['Calculus-Integrals: Partial Fractions']","This is an example of how to do a partial fractions decomposition when you're dealing with distinct quadratic factors.","stream","[]","[]","['Integrals', 'Fractional calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_b3h6jddf/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75235"
"fod100075234","","Distinct Linear Factors. Calculus-Integrals: Partial Fractions. Example 3","","8 min 37 sec","['Calculus-Integrals: Partial Fractions']","Partial fractions, or partial fractions decomposition, is a way to evaluate integrals of rational functions. There are four types of factors you need to deal with when you're working through a partial fractions decomposition: Distinct linear factors Repeated linear factors Distinct quadratic factors Repeated quadratic factors You may also have a combination of these types of factors. This video is an example of how to use partial fractions when you're dealing with distinct linear factors.","stream","[]","[]","['Integrals', 'Fractional calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_v3m90mnu/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75234"
"fod100075233","","Distinct Linear Factors. Calculus-Integrals: Partial Fractions. Example 2","","8 min 59 sec","['Calculus-Integrals: Partial Fractions']","Partial fractions, or partial fractions decomposition, is a way to evaluate integrals of rational functions. There are four types of factors you need to deal with when you're working through a partial fractions decomposition: Distinct linear factors Repeated linear factors Distinct quadratic factors Repeated quadratic factors You may also have a combination of these types of factors. This video is an example of how to use partial fractions when you're dealing with distinct linear factors.","stream","[]","[]","['Integrals', 'Fractional calculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_9us0s10k/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75233"
"fod100075232","","Tabular Integration. Calculus-Integrals: Integration by Parts","","8 min 49 sec","['Calculus-Integrals: Integration by Parts']","Tabular integration is an alternative method to integration by parts, most commonly used when part of the function you're trying to integrate is a power function. Since tabular integration can't always be used, where integration by parts can, this method isn't usually taught.","stream","[]","[]","['Calculus', 'Integration, Functional', 'Integrals']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_1czwmh35/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75232"
"fod100075231","","U-Substitution in Definite Integrals. Calculus-Integrals: U-Substitution","","10 min 36 sec","['Calculus-Integrals: U-Substitution']","When you use substitution in definite integrals, you have two options for dealing with the limits of integration. When you make the substitution, change the limits of integration so that they're associated with the substitution variable, instead of with the original variable. If you do this, you'll be able to plug the new limits of integration directly into the integrated function. When you make the substitution, leave the limits of integration in terms of the original variable. If you do this, you'll have to back-substitute to get the integration in terms of the original variable before evaluating over the limits of integration.","stream","[]","[]","['Calculus', 'Integrals']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hhl7swyh/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75231"
"fod100075230","","Part 2 of the FTC","","7 min 26 sec","['Calculus-Integrals: Fundamental Theorem of Calculus']","Part 2 of the Fundamental Theorem of Calculus defines the integral as the area under the curve.","stream","[]","[]","['Calculus', 'Integrals']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_mrep5jey/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75230"
"fod100075229","","Part 1 of the FTC","","11 min 32 sec","['Calculus-Integrals: Fundamental Theorem of Calculus']","The Fundamental Theorem of Calculus is the theorem that relates the derivative to the integral.","stream","[]","[]","['Calculus', 'Integrals']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hz4seyif/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75229"
"fod100075228","","Area Under or Enclosed by the Curve. Calculus-Integrals: Definite Integrals","","5 min 55 sec","['Calculus-Integrals: Definite Integrals']","When you're asked to find area under the graph, you need to find ""net area"". On the other hand, when you're asked to find area enclosed by the graph, you need to find ""gross area"".","stream","[]","[]","['Definite integrals', 'Approximation theory', 'Surfaces of constant curvature']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_5per1ryg/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75228"
"fod100075227","","Simpson's Rule. Calculus-Integrals: Approximating Area","","10 min 24 sec","['Calculus-Integrals: Approximating Area']","Simpson's rule, like Riemann sums and trapezoidal rule, is a method you can use to approximate the area under a curve.","stream","[]","[]","['Integrals', 'Surfaces of constant curvature', 'Approximation theory']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_9kfzo6wh/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75227"
"fod100075226","","Trapezoidal Rule. Calculus-Integrals: Approximating Area","","10 min 30 sec","['Calculus-Integrals: Approximating Area']","Trapezoidal rule, like Riemann sums and Simpson's rule, is a method you can use to approximate the area under the curve. Trapezoidal rule can be more accurate than the other methods, because it uses trapezoids to get close to the curve, instead of rectangles.","stream","[]","[]","['Integrals', 'Surfaces of constant curvature', 'Approximation theory']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_jfvqq4jr/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75226"
"fod100075225","","Over and Underestimation. Calculus-Integrals: Approximating Area","","10 min 7 sec","['Calculus-Integrals: Approximating Area']","In general, if a curve is always decreasing in an interval, using left endpoints for the riemann sum will give an overestimation of the area under the curve, whereas right endpoints will give an underestimation. On the other hand, if a curve is always increasing in an interval, using left endpoints for the riemann sum will give an underestimation of the area under the curve, whereas right endpoints will give an overestimation.","stream","[]","[]","['Integrals', 'Surfaces of constant curvature', 'Approximation theory']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_fk2nmb8m/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75225"
"fod100075224","","Riemann Sums, Midpoints. Calculus-Integrals: Approximating Area","","10 min 21 sec","['Calculus-Integrals: Approximating Area']","When you use a Riemann sum to approximate the area under the curve, you're just sketching rectangles under the curve, taking the area of each rectangle, and then adding the areas together. When you use midpoints, it means that you draw the rectangles such that the midpoints of their top edges touch the curve.","stream","[]","[]","['Integrals', 'Surfaces of constant curvature', 'Riemann surfaces', 'Approximation theory']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_mpx7n1th/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75224"
"fod100075223","","Riemann Sums, Right Endpoints. Calculus-Integrals: Approximating Area","","15 min 15 sec","['Calculus-Integrals: Approximating Area']","When you use a Riemann sum to approximate the area under the curve, you're just sketching rectangles under the curve, taking the area of each rectangle, and then adding the areas together. When you use right endpoints, it means that you draw the rectangles such that their upper-right corners touch the curve.","stream","[]","[]","['Integrals', 'Surfaces of constant curvature', 'Riemann surfaces', 'Approximation theory']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_cujze54j/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75223"
"fod100075222","","Riemann Sums, left Endpoints. Calculus-Integrals: Approximating Area","","9 min 0 sec","['Calculus-Integrals: Approximating Area']","When you use a Riemann sum to approximate the area under the curve, you're just sketching rectangles under the curve, taking the area of each rectangle, and then adding the areas together. When you use left endpoints, it means that you draw the rectangles such that their upper-left corners touch the curve.","stream","[]","[]","['Integrals', 'Surfaces of constant curvature', 'Riemann surfaces', 'Approximation theory']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_7zppf3x5/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75222"
"fod100075221","","Summation Notation, Collapsing. Calculus-Integrals: Approximating Area","","5 min 2 sec","['Calculus-Integrals: Approximating Area']","You can write an expanded sum in collapsed summation notation by identifying the pattern among the terms in the expanded sum.","stream","[]","[]","['Integrals', 'Area measurement', 'Approximation theory', 'Curvature']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_wgpcquqv/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75221"
"fod100075220","","Summation Notation, Expanding. Calculus-Integrals: Approximating Area","","3 min 19 sec","['Calculus-Integrals: Approximating Area']","You can expand a sum by plugging in each of the index numbers and taking the sum of the results.","stream","[]","[]","['Integrals', 'Area measurement', 'Approximation theory', 'Curvature']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_b1n5u8iv/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75220"
"fod100075219","","Summation Notation, finding the Sum. Calculus-Integrals: Approximating Area","","3 min 46 sec","['Calculus-Integrals: Approximating Area']","With a non-infinite sum, finding its value is as simple as plugging in each of the index numbers and taking the sum of the results.","stream","[]","[]","['Integrals', 'Area measurement', 'Approximation theory', 'Curvature']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_25lzfphq/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75219"
"fod100075218","","Marginal Cost, Revenue, and Profit. Calculus-Applications of Derivatives: Economics","","7 min 4 sec","['Calculus-Applications of Derivatives: Economics']","Marginal cost, revenue and profit represent the rate of change (the derivative) of the cost, revenue and profit, respectively.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_mgeiwalh/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75218"
"fod100075217","","Vertical Motion, Coin Dropped from the Roof. Calculus-Applications of Derivatives: Physics","","9 min 30 sec","['Calculus-Applications of Derivatives: Physics']","Determine the speed and velocity of an object dropped from a roof with this vertical motion problem.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_eswn37cp/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75217"
"fod100075216","","Vertical Motion, Ball Thrown Up from the Ground. Calculus-Applications of Derivatives: Physics","","9 min 36 sec","['Calculus-Applications of Derivatives: Physics']","We can find position, speed and velocity of an object thrown straight up from the ground.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_1cmttfev/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75216"
"fod100075215","","Position Function of a Particle. Calculus-Applications of Derivatives: Physics","","19 min 56 sec","['Calculus-Applications of Derivatives: Physics']","Given the position function of a particle, you can calculate all kinds of information about the particle, including its velocity and acceleration.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_e464yuiw/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75215"
"fod100075214","","Position Function. Calculus-Applications of Derivatives: Physics","","3 min 51 sec","['Calculus-Applications of Derivatives: Physics']","A position function describes the position of an object over time.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_w6splp65/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75214"
"fod100075213","","L'Hospital's Rule","","3 min 15 sec","[""Calculus-Applications of Derivatives: L'Hospital's Rule""]","L'Hospital's rule is used to get you out of sticky situations with indeterminate limit forms. If you plug into the function the number you're approaching and your result is indeterminate, you should apply L'Hospital's rule. To use it, take the derivatives of the numerator and denominator and replace the original numerator and denominator with their derivatives. Then plug in the number you're approaching. If you still get an indeterminate form, continue using L'Hospital's rule until you can use substitution to get a prettier answer (one that's not an indeterminate form).","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_raphu6ll/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75213"
"fod100075212","","Newton's Method","","9 min 21 sec","[""Calculus-Applications of Derivatives: Newton's Method""]","Newton's method is a way to approximate the root of a function (the point at which it crosses the x-axis), without having to solve for it exactly.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_o3thv93e/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75212"
"fod100075211","","Rolle's Theorem","","5 min 11 sec","['Calculus-Applications of Derivatives: Mean Value Theorem']","To arrive at the Mean Value Theorem, we first need to understand Rolle's Theorem. Rolle's Theorem applies to functions on a closed interval, where the function is differentiable on the open interval, and where the value of the function at the endpoints of the interval are equal to one another. For functions of this type, Rolle's Theorem tells us that there is a point inside the interval where the slope of the function's derivative is equal to 0; in other words, where the slope of the tangent line is 0.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_aw2n4bo6/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75211"
"fod100075210","","Mean Value Theorem for Derivatives","","11 min 20 sec","['Calculus-Applications of Derivatives: Mean Value Theorem']","The Mean Value Theorem guarantees that, at some point inside of a closed interval, the tangent line to the graph will be parallel to the line connecting the endpoints of that interval.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_gktt222c/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75210"
"fod100075209","","Ladder Sliding Down the Wall","","6 min 57 sec","['Calculus-Applications of Derivatives: Related Rates']","Find the rate of change of the top of a ladder when the ladder is sliding down and away from the wall at a specified rate.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_lizpk2bp/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75209"
"fod100075208","","Observer and the Airplane","","10 min 28 sec","['Calculus-Applications of Derivatives: Related Rates']","Find the rate of change of the distance between an observer and an airplane when the airplane is traveling at a specified rate.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_stw6zqh9/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75208"
"fod100075207","","Water Level in the Rank","","8 min 30 sec","['Calculus-Applications of Derivatives: Related Rates']","Find the rate of change of the water level in a water tank when the volume of water changes at a specified rate.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_xoeezo4g/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75207"
"fod100075206","","Price of the Product","","5 min 7 sec","['Calculus-Applications of Derivatives: Related Rates']","Find the rate of change of the price of an item when the quantity supplied changes at a specified rate.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hiyjx4r8/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75206"
"fod100075205","","Radius of the Balloon","","6 min 5 sec","['Calculus-Applications of Derivatives: Related Rates']","Find the rate of change of the radius of a spherical balloon when its volume changes at a specified rate.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_8kvtfq8j/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75205"
"fod100075204","","Sales Level that Maximizes Revenue","","7 min 35 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Maximize the revenue of a product while its price is constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_5mg1q41x/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75204"
"fod100075203","","Production Level and Sale Price that Maximize Profit","","10 min 21 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Maximize the profit of a product while the price of the product and the cost of production are constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_l61o3jbm/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75203"
"fod100075202","","Dimensions that Maximize the Volume of a Cylinder","","12 min 32 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Maximize the volume of a cylinder while its dimensions are constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_g7t37imu/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75202"
"fod100075201","","Width that Minimizes the Surface Area of an Open Top Box","","11 min 30 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Minimize the surface area of an open-top box while its volume is constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_1r52gfwm/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75201"
"fod100075200","","Dimensions that Minimize the Surface Area of an Open Top box","","11 min 35 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Minimize the surface area of an open-top box while its volume if constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_8kem08j3/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75200"
"fod100000752","","Marcus Garvey. Toward black nationhood","[2005], c1984","42 min","[]","This documentary examines the career of the pioneer black nationalist; it ranges from his birthplace in Jamaica to the United States, Europe, and Africa. Garvey (1887-1940) captured the imagination of black Americans during the 1920s with his impassioned call for an independent black nation. The program shows how Garvey's legacy inspired the civil rights movement in the U.S. and liberation movements throughout the Third World.","stream","['Garvey, Marcus']","['United States']","['Civil rights', 'Depressions', 'African Americans']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_wimfpuvo/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=752"
"fod100075199","","Dimensions that Maximize the Volume of a Box","","10 min 8 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Maximize the volume of a box while the sum of its length and girth is constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_d5nn4rzd/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75199"
"fod100075198","","Time when Velocity is Minimum","","5 min 43 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Minimize velocity when the velocity equation is fixed.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_zjsc5gp5/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75198"
"fod100075197","","Point on the Line Closest to Another Point","","7 min 17 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Minimize the distance between a line and a point while the equation of the line and the point are fixed.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_rcbo2cgg/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75197"
"fod100075196","","Two Real Numbers with Minimum Sum of Squares","","8 min 42 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Minimize the sum of the square of two real numbers while their product is constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_w7d8b76i/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75196"
"fod100075195","","Two Real Numbers with Minimum Product","","6 min 51 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Minimize the product of two real numbers while their difference is constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_9a1n8zcy/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75195"
"fod100075194","","Dimensions that Minimize Page Size with a Given Printed Area","","14 min 4 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Minimize the size of a piece of paper while an area on the paper and the margins around the area are constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_yaoayj2r/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75194"
"fod100075193","","Dimensions of a Rectangle that Minimize its Perimeter","","10 min 24 sec","['Calculus-Applications of Derivatives: Applied Optimization']","Minimize the cost of a rectangular fence while its area is constrained.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_5c2m5mkj/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75193"
"fod100075192","","Extrema on a Closed Interval. Calculus-Applications of Derivatives: Optimization","","13 min 18 sec","['Calculus-Applications of Derivatives: Optimization']","When you're looking for extrema in a closed interval, you're looking for the highest and lowest points that the function attains in the interval, including at the endpoints of the interval. For that reason, the candidates for extrema will always be only any critical points that lie inside the interval and the endpoints of the interval.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_u3dprb0v/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75192"
"fod100075191","","Sketching Graphs. Calculus-Applications of Derivatives: Optimization","","9 min 57 sec","['Calculus-Applications of Derivatives: Optimization']","Once we have all the information about the critical and inflection points of a function, where it's increasing and decreasing and concave up and concave down, and where its asymptotes exist, we can sketch the graph of the function.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hgfdl3iw/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75191"
"fod100075190","","Slant Asymptotes. Calculus-Applications of Derivatives: Optimization","","3 min 55 sec","['Calculus-Applications of Derivatives: Optimization']","Find the slant asymptote of a function by using polynomial long division to simplify the function.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_ge9quu62/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75190"
"fod100075189","","Horizontal Asymptotes. Calculus-Applications of Derivatives: Optimization","","8 min 11 sec","['Calculus-Applications of Derivatives: Optimization']","In this video, you'll learn how to find the horizontal asymptote of a rational function.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_f7ptyino/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75189"
"fod100075188","","Vertical asymptotes. Calculus-Applications of Derivatives: Optimization","","9 min 56 sec","['Calculus-Applications of Derivatives: Optimization']","The vertical asymptotes of a function exist wherever the function is undefined.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_lxzqpym5/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75188"
"fod100075187","","Second Derivative Test. Calculus-Applications of Derivatives: Optimization","","3 min 42 sec","['Calculus-Applications of Derivatives: Optimization']","The second derivative test lets you say where a function is increasing and decreasing, and therefore where it has local extrema. Just find the function's critical points, then find the second derivative of the function and evaluate each of the critical points in the second derivative.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_s7o8c3q2/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75187"
"fod100075186","","First Derivative Test. Calculus-Applications of Derivatives: Optimization","","15 min 26 sec","['Calculus-Applications of Derivatives: Optimization']","Use the first derivative test to say where the function is increasing and where it's decreasing. You just need to find the function's critical points, and then plug a value in between each critical point into the function's first derivative to test each interval.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_410q2mgj/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75186"
"fod100075185","","Concavity. Calculus-Applications of Derivatives: Optimization","","7 min 6 sec","['Calculus-Applications of Derivatives: Optimization']","In the same way that critical points indicate where a function changes direction, inflection points indicate where a function changes concavity. If a function is concave down (curving downwards like a rainbow) and hits an inflection point, it'll become concave up (curving upwards like a bowl). Conversely, if a function is concave up and hits an inflection point, it'll become concave down.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_xuqmild2/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75185"
"fod100075184","","Increasing and Decreasing. Calculus-Applications of Derivatives: Optimization","","8 min 15 sec","['Calculus-Applications of Derivatives: Optimization']","Once you find the critical points of a function, you can use the first derivative test to say where the function is increasing and where it's decreasing. This will also allow you to draw conclusions about the local extrema of the function at each of the critical points.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_6fea0h0q/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75184"
"fod100075183","","Critical Points. Calculus-Applications of Derivatives: Optimization","","16 min 4 sec","['Calculus-Applications of Derivatives: Optimization']","The critical points of a function are the points where the function changes direction. If the function was increasing and reaches a critical point, it starts decreasing there. Conversely, if a function was decreasing and reaches a critical point, then it starts increasing there. Therefore, the critical points of a function are the points that represent local maxima and minima of the function (its extrema). To find critical points, Take the derivative of the function and set the derivative equal to 0 Find the values of x that make the derivative equal to 0, or make it undefined. These are the critical numbers. Use the first derivative test to see whether or not the function actually changes direction at the critical numbers. Verify that the critical numbers are in the domain of the function.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_2d51744c/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75183"
"fod100075182","","Linear Approximation to Estimate a Root","","8 min 9 sec","['Calculus-Applications of Derivatives: Linear Approximation and Linearization']","We're often asked to use linear approximation to estimate the root of a constant. To do this, we just need to compare the given value to a function that's similar.","stream","[]","[]","['Approximation theory', 'Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_opp483jw/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75182"
"fod100075181","","Linear Approximation","","4 min 22 sec","['Calculus-Applications of Derivatives: Linear Approximation and Linearization']","The linear approximation of a function at a point is just the equation of the tangent line there. Since the value of the tangent line is very close to the value of the function near the point of tangency, we can use the linear approximation to estimate the function's value near that point.","stream","[]","[]","['Approximation theory', 'Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_byvvgah1/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75181"
"fod100075180","","Sales Decline. Calculus-Derivatives: Exponential Growth and Decay","","6 min 7 sec","['Calculus-Derivatives: Exponential Growth and Decay']","A company can use the sales decline formula to calculate how fast revenue will decline.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_gr0xvu4y/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75180"
"fod100075178","","Half Life. Calculus-Derivatives: Exponential Growth and Decay","","8 min 6 sec","['Calculus-Derivatives: Exponential Growth and Decay']","The half-life of an element is the amount of time it takes for that element to decay to half of its original amount.","stream","[]","[]","['Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_f68ckynx/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75178"
"fod100075176","","Horizontal and Vertical Tangent Lines and Differentiability. Calculus-Derivatives: Tangent and Normal Lines","","14 min 21 sec","['Calculus-Derivatives: Tangent and Normal Lines']","Horizontal tangent lines exist where the derivative is 0; vertical tangent lines exist where the derivative is undefined.","stream","[]","[]","['Coordinates, Tangential', 'Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_04gosu47/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75176"
"fod100075175","","Value that Makes Two Tangent Lines Parallel. Calculus-Derivatives: Tangent and Normal Lines","","15 min 18 sec","['Calculus-Derivatives: Tangent and Normal Lines']","Parallel lines will have the same slope, so we need to find the equation of each tangent line, identify their slopes, and then set the slopes equal to one another in order to find the value that makes them parallel.","stream","[]","[]","['Coordinates, Tangential', 'Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_kwdcpt61/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75175"
"fod100075174","","Tangent Lines. Calculus-Derivatives: Tangent and Normal Lines","","7 min 59 sec","['Calculus-Derivatives: Tangent and Normal Lines']","The tangent line of a function at a point is the line which is tangent to the function at the point, meaning that it only intersects the line at a single point there. The slope of the tangent line at a point is the slope of the function at that point.","stream","[]","[]","['Coordinates, Tangential', 'Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_sli0aufd/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75174"
"fod100075173","","Logarithmic Differentiation. Example 2","","7 min 58 sec","['Calculus-Derivatives: Logarithmic and Exponential Derivatives']","Sometimes it's easier to find the derivative of a function if you take the natural log of both sides of the equation first, and then use implicit differentiation to take the derivative. This process is called logarithmic differentiation.","stream","[]","[]","['Derivatives (Mathematics)', 'Logarithmic functions', 'Exponential functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_towl1cay/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75173"
"fod100075172","","Logarithmic Differentiation","","6 min 53 sec","['Calculus-Derivatives: Logarithmic and Exponential Derivatives']","Sometimes it's easier to find the derivative of a function if you take the natural log of both sides of the equation first, and then use implicit differentiation to take the derivative. This process is called logarithmic differentiation.","stream","[]","[]","['Derivatives (Mathematics)', 'Logarithmic functions', 'Exponential functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_cfyn57n3/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75172"
"fod100075171","","Logarithmic Derivatives. Example 2","","5 min 56 sec","['Calculus-Derivatives: Logarithmic and Exponential Derivatives']","The derivative of the natural log function ln(x) is just 1/x. If the value inside the log is more complicated than just ""x"", we'll have to apply chain rule and multiply by the derivative of that ""inside"" function in order to find the derivative of the log function.","stream","[]","[]","['Derivatives (Mathematics)', 'Logarithmic functions', 'Exponential functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_1gbixb0m/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75171"
"fod100075170","","Logarithmic Derivatives","","5 min 54 sec","['Calculus-Derivatives: Logarithmic and Exponential Derivatives']","The derivative of the natural log function ln(x) is just 1/x. If the value inside the log is more complicated than just ""x"", we'll have to apply chain rule and multiply by the derivative of that ""inside"" function in order to find the derivative of the log function.","stream","[]","[]","['Derivatives (Mathematics)', 'Logarithmic functions', 'Exponential functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_3no7hp7t/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75170"
"fod100075169","","Exponential Derivatives","","6 min 47 sec","['Calculus-Derivatives: Logarithmic and Exponential Derivatives']","The derivative of e(ax) is ae(ax). In this video we'll apply that formula and the product and chain rules in order to find the derivative of the product of two functions, one of which is an exponential function.","stream","[]","[]","['Derivatives (Mathematics)', 'Logarithmic functions', 'Exponential functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_pzq2x70f/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75169"
"fod100075168","","Implicit Differentiation, Equation of the Tangent Line. Calculus-Derivatives: Implicit Differentiation. Example 2","","7 min 23 sec","['Calculus-Derivatives: Implicit Differentiation']","This video explains how to find the equation of the tangent line to a curve, when that curve is defined by a function that can't be solved for y in terms of x. We'll use implicit differentiation to find the slope of the tangent line.","stream","[]","[]","['Calculus', 'Derivatives (Mathematics)', 'Implicit functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_p3cosasz/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75168"
"fod100075167","","Implicit Differentiation. Calculus-Derivatives: Implicit Differentiation","","10 min 23 sec","['Calculus-Derivatives: Implicit Differentiation']","With normal differentiation, we take the derivative with respect to one variable only, usually x. With implicit differentiation, we take the derivative with respect to both x and y. Whenever we take the derivative with respect to y, we have to remember to multiply by y', or dy/dx. Implicit differentiation is important because it lets us take the derivative of any equation that can't be solved for y in terms of x.","stream","[]","[]","['Calculus', 'Derivatives (Mathematics)', 'Implicit functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_exlb419j/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75167"
"fod100075166","","Hyperbolic Derivatives. Calculus-Derivatives: Trigonometric Derivatives","","4 min 20 sec","['Calculus-Derivatives: Trigonometric Derivatives']","This is an example of how to find the derivative of hyperbolic sine, using the formula for its derivative, and chain rule.","stream","[]","[]","['Calculus', 'Derivatives (Mathematics)', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_jjkx67te/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75166"
"fod100075165","","Trigonometric Derivatives, Cotangent. Calculus-Derivatives: Trigonometric Derivatives","","5 min 23 sec","['Calculus-Derivatives: Trigonometric Derivatives']","This is an extra example of how to find the derivative of the cotangent function, using power rule and chain rule.","stream","[]","[]","['Calculus', 'Derivatives (Mathematics)', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_6tvtakou/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75165"
"fod100075164","","Trigonometric Derivatives. Calculus-Derivatives: Trigonometric Derivatives","","19 min 7 sec","['Calculus-Derivatives: Trigonometric Derivatives']","We'll talk about the derivatives of each of the six trigonometric functions, how to apply chain rule when finding the derivatives of trig functions, and how to find the derivatives of higher-order trigonometric functions using power rule and chain rule.","stream","[]","[]","['Calculus', 'Derivatives (Mathematics)', 'Trigonometrical functions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_nqz4wt1b/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75164"
"fod100075163","","Chain Rule with Power Rule. Calculus-Derivatives: Chain Rule","","6 min 26 sec","['Calculus-Derivatives: Chain Rule']","If you need to use power rule to take the derivative of a function, but the ""inside"" function is not just ""x"", you'll need to apply chain rule, multiplying the derivative of the power function by the derivative of the ""inside"" function.","stream","[]","[]","['Calculus', 'Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_gybnpel6/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75163"
"fod100075162","","Product Rule, Two Functions. Calculus-Derivatives: Derivative Rules","","9 min 50 sec","['Calculus-Derivatives: Derivative Rules']","Whenever you need to find the derivative of the product of two functions, you have to use product rule, you can't just take the derivative of each function separately and then multiply the results.","stream","[]","[]","['Calculus', 'Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_s9ykqkz0/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75162"
"fod100075161","","Power Rule. Calculus-Derivatives: Derivative Rules","","5 min 21 sec","['Calculus-Derivatives: Derivative Rules']","You can factor out the coefficient of a power function before using power rule to take the derivative. If you have the sum or difference of many power functions in the form of a polynomial function, you can use power rule on each term individually to find the derivative of the entire linear combination.","stream","[]","[]","['Calculus', 'Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_c3m6zvl7/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75161"
"fod100075160","","Definition of the Derivative. Calculus-Derivatives: Definition of the Derivative","","12 min 14 sec","['Calculus-Derivatives: Definition of the Derivative']","The definition of the derivative builds on the difference quotient and represents the slope of the tangent line.","stream","[]","[]","['Calculus', 'Derivatives (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_net8gmk5/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75160"
"fod100075159","","Intermediate Value Theorem Overview. Calculus-Limits & Continuity: Continuity","","7 min 9 sec","['Calculus-Limits & Continuity: Continuity']","The intermediate value theorem lets you prove that a function has a least one real root over a closed interval.","stream","[]","[]","['Calculus', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_dwx0r8qr/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75159"
"fod100075158","","Making the Function Continuous. Calculus-Limits & Continuity: Continuity","","11 min 10 sec","['Calculus-Limits & Continuity: Continuity']","When you have a piecewise-defined function that includes a variable, you can find the value of that variable that makes the function continuous. Just plug in the value where the ""split"" occurs, then set the remaining two functions equal to one another and solve for the remaining variable. You're basically just finding the value that makes the left- and right-hand limits equal, which would make the function continuous.","stream","[]","[]","['Calculus', 'Functions', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_3ttmawdq/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75158"
"fod100075157","","Removable Discontinuities. Calculus-Limits & Continuity: Continuity","","8 min 15 sec","['Calculus-Limits & Continuity: Continuity']","If the graph of a function as a hole at a single point, it's called a removable discontinuity because the discontinuity can be ""removed"" just by redefining the value of the function at that singular point. Any rational function in which you can cancel the same factor from the numerator and denominator, has a removable discontinuity.","stream","[]","[]","['Calculus', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_d0u27nb5/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75157"
"fod100075156","","Continuity. Calculus-Limits & Continuity: Continuity","","3 min 31 sec","['Calculus-Limits & Continuity: Continuity']","Functions are discontinuous where they are undefined, or where they have holes, breaks, gaps, corners, or jumps. When you define the domain of a function, you want to make sure to indicate that the function's points of discontinuity are not included the domain.","stream","[]","[]","['Calculus', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_5xnkhpsn/version/100001/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75156"
"fod100075155","","Squeeze Theorem","","4 min 35 sec","['Calculus-Limits & Continuity: Definition of the Limit']","The squeeze theorem is another method we can use to find the limit of a function. If we can show that the limit of a function at a point is always greater than or equal to some value and less than or equal to that same value, than by the squeeze theorem we can prove that the limit of the function a that point has the same value.","stream","[]","[]","['Calculus', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_ra8pb2nf/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75155"
"fod100075154","","Precise Definition of the Limit","","11 min 27 sec","['Calculus-Limits & Continuity: Definition of the Limit']","The precise definition of the limit (also called the epsilon-delta definition of the limit), is just a way for us to prove that a limit exists. This is one of the hardest topics in calculus, so don't get discouraged if you need to go over it multiple times!","stream","[]","[]","['Calculus', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_2fgf1bd2/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75154"
"fod100075153","","One-sided Limits","","9 min 25 sec","['Calculus-Limits & Continuity: Definition of the Limit']","The general limit of a function only exists when the left-hand limit exists, the right-hand limit exists, and the left- and right-hand limits are equal to one another. Even when the general limit doesn't exist because one of these conditions isn't met, the one-sided limits (the left-hand limit and/or the right-hand limit), can still exist independently.","stream","[]","[]","['Calculus', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_wlh2etn1/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75153"
"fod100075152","","Trigonometric Limits","","4 min 49 sec","['Calculus-Limits & Continuity: Other Kinds of Limits']","When you have to find the limit of trigonometric functions, there are special trig limit formulas you'll want to use in order to simplify your function to a point where you can evaluate its limit.","stream","[]","[]","['Calculus', 'Trigonometrical functions', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_zld37d2v/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75152"
"fod100075151","","Crazy Graphs. Calculus-Limits & Continuity: Solving Limits","","7 min 47 sec","['Calculus-Limits & Continuity: Solving Limits']","Sometimes you'll be asked to find various limits of a function defined by a ""crazy graph"". The trick is to understand that the limit is just the value the function approaches as you trace your finger along the graph toward the limit value. You may find that the left- and right-hand limits of a function are different at some points, and that the value of the function at a point is not always equal to the limit of the function there.","stream","[]","[]","['Calculus', 'Algebra', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_jef63h9i/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75151"
"fod100075150","","Solving Limits with Conjugate Method. Calculus-Limits & Continuity: Solving Limits","","6 min 27 sec","['Calculus-Limits & Continuity: Solving Limits']","To use conjugate method to solve for the limit of a rational function, just multiply the numerator and denominator by the conjugate. This might simplify the fraction to the point where you can use substitution with the remaining function to find the limit.","stream","[]","[]","['Calculus', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_zwsmbdf4/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75150"
"fod100075149","","Solving Limits with Factoring. Calculus-Limits & Continuity: Solving Limits","","4 min 31 sec","['Calculus-Limits & Continuity: Solving Limits']","To use factoring to solve for the limit of a rational function, just factor the numerator and denominator completely, then see if you can cancel common factors from the fraction. This might simplify the fraction to the point where you can use substitution with the remaining function to find the limit.","stream","[]","[]","['Calculus', 'Factorization (Mathematics)', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_aocb6x5e/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75149"
"fod100075148","","Solving Limits with Substitution. Calculus-Limits & Continuity: Solving Limits","","2 min 46 sec","['Calculus-Limits & Continuity: Solving Limits']","To use substitution to solve a limit problem, just plug the number you're approaching into the function. If you get a real-number answer, then the substitution worked. If not, you'll need to use a different technique to solve for the limit.","stream","[]","[]","['Calculus', 'Continuity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_y9tfrhib/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75148"
"fod100075147","","Unit Circle. Calculus-Precalculus: Trigonometry","","18 min 15 sec","['Calculus-Precalculus: Trigonometry']","Everything you need to know about the unit circle.","stream","[]","[]","['Precalculus', 'Trigonometry', 'Circle']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_5kochj5f/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75147"
"fod100075146","","Inverse Functions","","6 min 1 sec","['Calculus-Precalculus: Inverse Functions and Logarithms']","The inverse of a function is its reflection over the line y=x.","stream","[]","[]","['Precalculus', 'Logarithms', 'Functions, Inverse']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_ccc7sthc/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75146"
"fod100075145","","Circles, Center and Radius. Calculus-Precalculus: Graphing Functions","","5 min 47 sec","['Calculus-Precalculus: Graphing Functions']","How to find the center and radius of a circle.","stream","[]","[]","['Functions', 'Precalculus', 'Algebra']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hocuzly4/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75145"
"fod100075144","","Domain and Range. Calculus-Precalculus: Functions","","8 min 39 sec","['Calculus-Precalculus: Functions']","The domain of a function is the set of real numbers for which the function is defined. The function's range is the set of all the values that are returned when the domain is plugged into the function.","stream","[]","[]","['Functions', 'Precalculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_iqc2dugf/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75144"
"fod100075143","","Vertical Line Test. Calculus-Precalculus: Functions","","6 min 10 sec","['Calculus-Precalculus: Functions']","An equation is a function if it passes the vertical line test, which means that no perfectly vertical line intersects its graph at more than one point.","stream","[]","[]","['Functions', 'Precalculus']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hyenrlaw/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75143"
"fod100075141","","Triangle Side-Splitting Theorem. Geometry-Dilations and Scale Factors","","4 min 24 sec","['Geometry-Dilations and Scale Factors']","In this video we'll learn how to use the triangle side-splitting theorem to find the lengths of the sides of a triangle. The theorem tells us that, when we place a line segment inside a triangle which has its endpoints on opposite sides of the triangle and which is parallel to the side it doesn't touch, then we can set up a proportion between the lengths of the sides of the smaller triangle and the lengths of the sides of the bigger triangle.","stream","[]","[]","['Triangle', 'Geometry, Algebraic']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hpjgs396/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75141"
"fod100075140","","Triangle Similarity Statements. Geometry-Dilations and Scale Factors","","9 min 6 sec","['Geometry-Dilations and Scale Factors']","In this video we'll learn how to use the SSS (side-side-side), SAS (side-angle-side), and AA (angle-angle) theorems to prove that two triangles are similar. Similar triangles are triangles that have three congruent interior angle measures. They may have different side lengths, or they may be rotated or flipped, but their three interior angles are the same.","stream","[]","[]","['Triangle', 'Geometry, Algebraic']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_yrozt79t/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75140"
"fod100007514","","Multiple genders. Mind and body in conflict","[2006], c1997","39 min","[]","Instinctively, we say there are two sexes. But does this always reflect reality? In this program, Dr. Stephen Whittle argues that it does not. Whittle further contends that society must recognize transsexuals, like himself, and others, like Arthur and Del, who are hermaphrodites-sexual hybrids. Arthur has male and female attributes and wants to keep them in the interest of maintaining his psychic balance and identity. Del, born female, favors her male side and has written a book charting her physical transition to an ""inter-sex. A theologian addresses the moral implications of multisexual orientation, while a physician and polygendered people ask: Is sex the same as gender? Are inter-sexes mistakes or part of nature? Do parents have the right to demand reconstructive surgery for their polysexual newborns? A thoughtful and measured investigation of a seldom-discussed and provocative topic.","stream","[]","[]","['Man-woman relationships', 'Equality', 'Families', 'Sex differences (Psychology)', 'Gender identity', 'Sexism', 'Psychosexual disorders', 'Sex discrimination', 'Genitourinary organs', 'Intimacy (Psychology)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_s8sbtzo6/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7514"
"fod100075139","","Similar Triangles. Geometry-Dilations and Scale Factors","","4 min 52 sec","['Geometry-Dilations and Scale Factors']","In this video we'll learn how to solve for unknown values in two similar triangles. Similar triangles are triangles that have the same three interior angles, but different side lengths. If two triangles have the same three interior angles, then we can set up a proportion between their side lengths.","stream","[]","[]","['Triangle', 'Geometry, Algebraic']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_oi394igt/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75139"
"fod100075138","","MidPoint of a Line Segment in Three Dimensions. Geometry-Shapes in Space","","2 min 26 sec","['Geometry-Shapes in Space']","In this video we'll learn how to find the midpoint of a line segment that's lying in three dimensions. The endpoints of the line segment will be given as coordinate points in three-dimensional space, and we'll take the average of the x-values, the average of the y-values, and the average of the z-values in order to find the coordinate point that represents the midpoint of the line segment.","stream","[]","[]","['Geometry, Algebraic', 'Coordinates']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_cuhrppoz/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75138"
"fod100075137","","Distance Between Two Points in Three Dimensions. Geometry-Shapes in Space","","4 min 22 sec","['Geometry-Shapes in Space']","In this video we'll learn how to find the distance between two points in three-dimensional coordinate space. If we're given both points in the form (x,y,z), we'll use the distance formula for three dimensions (three variables) to find the distance between the points.","stream","[]","[]","['Geometry, Algebraic', 'Coordinates']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_qspn52f3/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75137"
"fod100075136","","Diagonal of a Right Rectangular Prism. Geometry-Shapes in Space","","6 min 5 sec","['Geometry-Shapes in Space']","In this video we'll learn how to find the length of the diagonal of a right rectangular prism. We'll need to use the length, width and height of the prism to find the diagonal of one side, and then use that to find the diagonal of the prism.","stream","[]","[]","['Prisms', 'Geometry, Algebraic']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_4smjn274/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75136"
"fod100075135","","Translation Vectors. Geometry-Triangle Congruence","","4 min 33 sec","['Geometry-Triangle Congruence']","In this video we'll learn how to translate a figure along a vector. The length and direction of the vector will dictate where we move the figure.","stream","[]","[]","['Triangle', 'Geometry, Algebraic', 'Congruences (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_wa82igdk/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75135"
"fod100075134","","CPCTC. Geometry-Triangle Congruence","","4 min 32 sec","['Geometry-Triangle Congruence']","In this video we'll learn how to use CPCTC (congruent parts of congruent triangles are congruent) as part of a proof. If you can establish that two triangles are congruent, then you can say that corresponding parts of the triangles are congruent.","stream","[]","[]","['Triangle', 'Geometry, Algebraic', 'Congruences (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_avzyu0cg/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75134"
"fod100075133","","Isosceles Triangle Theorem. Geometry-Triangle Congruence","","7 min 10 sec","['Geometry-Triangle Congruence']","In this video we'll learn about the isosceles triangle theorem, which tells us that, when we have an isosceles triangle (a triangle in which two of the sides are congruent), the angles opposite the congruent sides will also be congruent.","stream","[]","[]","['Triangle', 'Geometry, Algebraic', 'Congruences (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_baq68qpj/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75133"
"fod100075132","","Triangle Congruence with AAS, HL. Geometry-Triangle Congruence","","7 min 8 sec","['Geometry-Triangle Congruence']","In this video we'll learn how to say whether or not two triangles are congruent, using the angle-angle-side (AAS) and hypotenuse-leg (HL) theorems of triangle congruence.","stream","[]","[]","['Triangle', 'Geometry, Algebraic', 'Congruences (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_k3qoikm2/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75132"
"fod100075131","","Triangle Congruence with SSS, ASA, SAS. Geometry-Triangle Congruence","","8 min 37 sec","['Geometry-Triangle Congruence']","In this video we'll learn how to say whether or not two triangles are congruent, using the side-side side (SSS), angle-side-angle (ASA) and side-angle-side (SAS) theorems of triangle congruence.","stream","[]","[]","['Triangle', 'Geometry, Algebraic', 'Congruences (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_a030b0nc/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75131"
"fod100075130","","Line Segments, Parallel, Perpendicular or Neither. Geometry-Parallels and Polygons","","11 min 39 sec","['Geometry-Parallels and Polygons']","In this video we'll learn how to determine whether two line segments are parallel, perpendicular, or neither. If they're parallel, they'll have the same slope. If they're perpendicular, their slopes will be the negative reciprocals of one another. If neither of these is the case, then the line segments are neither parallel nor perpendicular.","stream","[]","[]","['Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_81y3swnf/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75130"
"fod100075129","","Line Segments, Slope and MidPoint. Geometry-Parallels and Polygons","","6 min 8 sec","['Geometry-Parallels and Polygons']","In this video we'll learn how to find the slope and midpoint of a line segment, given its endpoints. To find the slope, we'll use rise over run. To find the midpoint, we'll take the average of the x-values in the endpoints, and the average of the y-values in the endpoints, and these new values will define the midpoint.","stream","[]","[]","['Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_t1brqcgn/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75129"
"fod100075128","","MidSegments of Trapezoids. Geometry-Parallels and Polygons","","7 min 53 sec","['Geometry-Parallels and Polygons']","In this video we'll learn how to use the midsegment of a trapezoid to establish a relationship between the smaller, interior trapezoid, and the larger, exterior trapezoid. When a line segment has its endpoints on the non-parallel sides of the trapezoid, and it's parallel to the parallel sides of the trapezoid (the bases), we can set up a proportion between the side lengths.","stream","[]","[]","['Trapezoid', 'Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_autjhw5y/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75128"
"fod100075127","","MidSegments of Triangles. Geometry-Parallels and Polygons","","8 min 52 sec","['Geometry-Parallels and Polygons']","In this video we'll learn how to use the midsegment of a triangle to establish a relationship between the smaller, interior triangle, and the larger, exterior triangle. When a line segment has its endpoints on opposite sides of the triangle, and it's parallel to the base of the triangle, we can set up a proportion between the side lengths.","stream","[]","[]","['Triangle', 'Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_wkcofeti/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75127"
"fod100075126","","Exterior Angles of Polygons. Geometry-Parallels and Polygons","","7 min 51 sec","['Geometry-Parallels and Polygons']","In this video we'll learn how to find the measures of the exterior angles of a polygon.","stream","[]","[]","['Angles (Geometry)', 'Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hjgmoayd/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75126"
"fod100075125","","Interior Angles of Polygons. Geometry-Parallels and Polygons","","8 min 14 sec","['Geometry-Parallels and Polygons']","In this video we'll learn how to find the interior angle measures of polygons, no matter how many sides the polygon has.","stream","[]","[]","['Angles (Geometry)', 'Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_48558419/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75125"
"fod100075124","","Interior Angles of Triangles. Geometry-Parallels and Polygons","","8 min 51 sec","['Geometry-Parallels and Polygons']","In this video we'll learn how to find the interior angle measures of triangles. We know that the three interior angles of a triangle will always sum of 180 degrees.","stream","[]","[]","['Angles (Geometry)', 'Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_wh74n57z/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75124"
"fod100075123","","Angles of Transversals. Geometry-Parallels and Polygons","","12 min 46 sec","['Geometry-Parallels and Polygons']","In this video we'll learn about angles around transversals, which are lines that intersect two other, parallel lines. We'll be able to identify vertical angles, but also supplementary angles, alternate interior angles, and alternate exterior angles.","stream","[]","[]","['Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_zuw7bd2x/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75123"
"fod100075122","","Measures of Parallelograms with Algebra. Geometry-Parallels and Polygons","","6 min 27 sec","['Geometry-Parallels and Polygons']","In this video we'll learn how to find side lengths and interior angle measures of parallelograms, when we're given other measures of the parallelogram as algebraic expressions. We just have to remember that parallelograms are quadrilaterals (four-sided figures), in which opposite sides are congruent and parallel.","stream","[]","[]","['Parallelograms', 'Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_nhlxei02/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75122"
"fod100075121","","Measures of Quadrilaterals. Geometry-Parallels and Polygons","","12 min 41 sec","['Geometry-Parallels and Polygons']","In this video we'll learn how to find side lengths and interior angle measures of quadrilaterals, when we're given other measures of the quadrilateral. Specifically, we'll look at parallelograms, rhombuses, and rectangles.","stream","[]","[]","['Quadrilaterals', 'Parallels (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_tqzl9xkg/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75121"
"fod100075120","","Congruent Angles. Geometry-Simple Logic and Proofs","","9 min 54 sec","['Geometry-Simple Logic and Proofs']","In this video we'll learn how to identify congruent angles of intersecting lines. Vertical angles (opposite angles) area always congruent.","stream","[]","[]","['Angles (Geometry)', 'Congruences (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_5ujlb2fj/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75120"
"fod100007512","","Nathaniel Hawthorne","[2005], c1998","29 min","['Nathaniel Hawthorne']","For many, The Scarlet Letter represents the pinnacle of 19th-century literature. In this program, three leading Hawthorne scholars use the novel and several Hawthorne short stories to explore issues of interpretation and literary analysis. Each work is discussed in relation to American culture and political events. Significant details of Hawthorne's life are also illuminated. Experts include Millicent Bell, a leading Hawthorne scholar; Professor Larry Reynolds, President of the Hawthorne Society; and Professor Brenda Wineapple, author of a biography on Hawthorne.","stream","['Hawthorne, Nathaniel']","[]","['American literature']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_s7qqxtdw/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7512"
"fod100075119","","Adjacent and Nonadjacent Angles. Geometry-Simple Logic and Proofs","","6 min 9 sec","['Geometry-Simple Logic and Proofs']","In this video we'll define adjacent angles and identify adjacent and non-adjacent angles. Adjacent angles must share a vertex and one side, and must not have any of the same interior points.","stream","[]","[]","['Angles (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_ziye51mv/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75119"
"fod100075118","","Arranging Condtionals in a Logical Chain. Geometry-Simple Logic and Proofs","","4 min 12 sec","['Geometry-Simple Logic and Proofs']","In this video we'll learn how to arrange related conditional statements into a logical chain. The logical statements will be ""if-then"" statements, and we'll be looking to arrange them as If A, then B If B, then C If C, then D Therefore, if A, then D.","stream","[]","[]","['Logic, Symbolic and mathematical']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_onggo7ao/version/100011/acv/191/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75118"
"fod100075117","","Converses of Conditionals. Geometry-Simple Logic and Proofs","","4 min 30 sec","['Geometry-Simple Logic and Proofs']","In this video we'll learn how to write the converse statements of conditional statements. Even if a conditional statement is always true, its converse statement may be true, but isn't necessarily always true. To write the converse statement, we just reverse the ""if"" part with the ""then"" part.","stream","[]","[]","['Logic, Symbolic and mathematical']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_en741zcj/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75117"
"fod100075116","","Conditionals and Euler Diagrams. Geometry-Simple Logic and Proofs","","3 min 11 sec","['Geometry-Simple Logic and Proofs']","In this video we'll learn how to turn a statement into a conditional, ""if-then"" statement. Then we'll draw a Euler diagram that represents the conditional.","stream","[]","[]","['Logic, Symbolic and mathematical']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_3sntefb2/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75116"
"fod100075115","","Reflecting Figures in Coordinate space. Geometry-Introduction to Geometry","","10 min 27 sec","['Geometry-Introduction to Geometry']","In this video we'll learn how to reflect figures in coordinate space, specifically, how to reflect them across the x-axis and y-axis. Reflection of a figure is a type of transformation of a figure, where we move it from one spot to another.","stream","[]","[]","['Geometry', 'Shapes']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_in509u5a/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75115"
"fod100075114","","Rotating Figures in Coordinate space. Geometry-Introduction to Geometry","","9 min 54 sec","['Geometry-Introduction to Geometry']","In this video we'll learn how to rotate figures in coordinate space, specifically, how to rotate them by 90 or 180 degrees. Rotation of a figure is a type of transformation of a figure, where we move it from one spot to another.","stream","[]","[]","['Geometry', 'Shapes']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_xtdqdc81/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75114"
"fod100075113","","Translating Figures in Coordinate space. Geometry-Introduction to Geometry","","6 min 55 sec","['Geometry-Introduction to Geometry']","In this video we'll learn how to translate figures in coordinate space, specifically, how to move them by adding or subtracting a specific value from all of the x- or y-values in the coordinate points.","stream","[]","[]","['Geometry', 'Algebra', 'Shapes']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_6wsof0vj/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75113"
"fod100075112","","Circumscribed and Inscribed Circles of a Triangle. Geometry-Introduction to Geometry","","4 min 47 sec","['Geometry-Introduction to Geometry']","In this video we'll learn how to draw circumscribed circles of triangles and inscribed circles of triangles. A circumscribed circle is a circle for which all three vertices of the triangle lie on the circle. An inscribed circle is the circle that touches all three sides of the triangle.","stream","[]","[]","['Geometry', 'Triangle', 'Circle']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_4a23v96w/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75112"
"fod100075111","","Perpendicular and Angle Bisectors. Geometry-Introduction to Geometry","","5 min 43 sec","['Geometry-Introduction to Geometry']","In this video we'll learn how to find the perpendicular and angle bisectors of triangles. Perpendicular bisectors are the lines that are perpendicular to each side of the triangle and intersect them at their midpoints. The angle bisectors of a triangle are the lines that divide its interior angles perfectly in half.","stream","[]","[]","['Geometry', 'Angles (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_n4ylg0x9/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75111"
"fod100075110","","Measures of Angles with Algebra. Geometry-Introduction to Geometry","","6 min 28 sec","['Geometry-Introduction to Geometry']","In this video we'll learn how to use algebra to find the measures of angles that are given as algebraic expressions.","stream","[]","[]","['Geometry', 'Angles (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_rv0arsg9/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75110"
"fod100075109","","Measures of Angles. Geometry-Introduction to Geometry","","8 min 33 sec","['Geometry-Introduction to Geometry']","In this video we'll learn how to find the measures of angles, given that some of the angles are congruent and supplementary.","stream","[]","[]","['Geometry', 'Angles (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_zp39a0t4/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75109"
"fod100075108","","Length of a Line Segment. Geometry-Introduction to Geometry","","7 min 38 sec","['Geometry-Introduction to Geometry']","In this video we'll learn how to find the length of a line segment.","stream","[]","[]","['Geometry', 'Length measurement']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_zlkusvjr/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75108"
"fod100075107","","Naming Simple Geometric Figures. Geometry-Introduction to Geometry","","8 min 52 sec","['Geometry-Introduction to Geometry']","In this video we'll learn how to name simple geometric figures by labeling each vertex of the figure with a letter and identifying the figure by stringing the letters together in a clockwise or counter-clockwise order.","stream","[]","[]","['Geometry', 'Shapes']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_st4ruxf5/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75107"
"fod100075106","","Surface Area of Spheres. Geometry-Three-Dimensional Geometry","","4 min 30 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to find the surface area of Spheres. The formula we always use to find surface area only requires us to know the length of the radius of the sphere. If we know the diameter of the sphere, we can take half of it to get the radius, and then plug the length of the radius into the equation for surface area.","stream","[]","[]","['Sphere', 'Geometry, Solid', 'Area measurement']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_n2z3emp1/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75106"
"fod100075105","","Volume of Spheres. Geometry-Three-Dimensional Geometry","","5 min 2 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to find the volume of Spheres. We'll always use the same volume formula, which only requires us to know the length of the radius of the sphere. If we've been given the length of the diameter, we can just take half of the diameter to get the radius, and then plug the radius into the volume formula.","stream","[]","[]","['Sphere', 'Geometry, Solid', 'Volume (Cubic content)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_jocwf8vo/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75105"
"fod100075104","","Surface Area of Cones. Geometry-Three-Dimensional Geometry","","4 min 45 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to find the surface area of right circular Cones. A right circular cone is a cone whose base is a circle and that has a right angle (90-degree angle) between the base of the cone and it's altitude. When we find the surface area of a cone, we'll use the formula for the area of a circle in order to find the area of the base of the cone, and then we'll use the slant height of the cone in order to find the surface area of the lateral face.","stream","[]","[]","['Geometry, Solid', 'Area measurement', 'Cone']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_d5tjk2fm/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75104"
"fod100075103","","Volume of Cones. Geometry-Three-Dimensional Geometry","","4 min 15 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to find the volume of circular Cones. A circular cone is a cone whose base is a circle. We'll use a volume formula that requires us to know the radius of the circular base and the length of the altitude (the height) of the cone.","stream","[]","[]","['Volume (Cubic content)', 'Geometry, Solid', 'Cone']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_r0ucc8mg/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75103"
"fod100075102","","Nets of Cones. Geometry-Three-Dimensional Geometry","","3 min 14 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to draw nets of right circular Cones. A right circular cone is a cone whose base is a circle and that has a right angle (90-degree angle) between the base of the cone and it's altitude. A net is the two-dimensional shape that can be folded into the three-dimensional object.","stream","[]","[]","['Geometry, Solid', 'Cone']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_tq68d5gs/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75102"
"fod100075101","","Surface Area of Cylinders. Geometry-Three-Dimensional Geometry","","6 min 44 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to find the surface area of cylinders, which we'll do by finding the area of the base (the area of a circle), and multiplying that by 2 to account for the surface area of the top and the bottom of the cylinder. The surface area of the side we'll find by recognizing that the side is a rectangle with length equal to the circumference of the circular base, and width equal to the height of the cylinder.","stream","[]","[]","['Geometry, Solid', 'Cylinder (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_9mm6wcl3/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75101"
"fod100075100","","Volume of Cylinders. Geometry-Three-Dimensional Geometry","","4 min 46 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to find the volume of cylinders. To do this, we'll find the area of the base of the cylinder, which will just be the area of a circle, and then we'll multiply the area of the base by the height of the cylinder in order to find the volume.","stream","[]","[]","['Volume (Cubic content)', 'Geometry, Solid', 'Cylinder (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_fy2p9g7f/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75100"
"fod100075099","","Nets of Cylinders. Geometry-Three-Dimensional Geometry","","4 min 0 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to draw the nets of cylinders. A net is just the shape of the two-dimensional sheet that can be folded into the three-dimensional object.","stream","[]","[]","['Geometry, Solid', 'Cylinder (Mathematics)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_spysldlo/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75099"
"fod100075098","","Surface Area of Pyramids. Geometry-Three-Dimensional Geometry","","6 min 35 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to find the surface area of regular pyramids. Since all of the lateral faces of the pyramid are congruent, we can always use the same formula for surface area. We'll just need to know the perimeter of the base, the slant height of the lateral faces, and the area of the base.","stream","[]","[]","['Geometry, Solid', 'Area measurement', 'Pyramid (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_9kufqtx1/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75098"
"fod100075097","","Volume of Pyramids. Geometry-Three-Dimensional Geometry","","4 min 4 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how find the volume of pyramids. To find the volume, we'll always use the same volume formula.","stream","[]","[]","['Volume (Cubic content)', 'Geometry, Solid', 'Pyramid (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_6kzyqyrs/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75097"
"fod100075096","","Nets of Pyramids. Geometry-Three-Dimensional Geometry","","4 min 5 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to draw the nets of pyramids, including a square pyramid, a triangular pyramid, and a pentagonal pyramid. A net is just the shape of the two-dimensional piece of paper that can be folded into a three-dimensional figure.","stream","[]","[]","['Geometry, Solid', 'Pyramid (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_eehgw5fb/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75096"
"fod100075095","","Surface Area to Volume Ratio of Prisms. Geometry-Three-Dimensional Geometry","","8 min 20 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to find the ratio between the surface area of a rectangular prism and the volume of a rectangular prism, including a cube and a right rectangular prism.","stream","[]","[]","['Geometry, Solid', 'Area measurement', 'Prisms']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_8h5499gr/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75095"
"fod100075094","","Surface Area of Prisms. Geometry-Three-Dimensional Geometry","","7 min 19 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to find the surface area of right rectangular prisms. Since opposite faces of the prism are congruent, we can find the area of the base and multiply it by 2 in order to account for the surface area of the top and bottom; find the area of the left face and multiply it by 2 in order to account for the surface area of the left and right; and find the area of the front face and multiply it by 2 in order to account for the surface area of the front and back.","stream","[]","[]","['Geometry, Solid', 'Area measurement', 'Prisms']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_xc6dfzmf/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75094"
"fod100075093","","Volume of Prisms. Geometry-Three-Dimensional Geometry","","3 min 10 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how find the volume of right rectangular prisms. To find the volume, we'll just multiply the length by the width, which will give us the area of the base, and then multiply that area by the height, which will give us volume.","stream","[]","[]","['Volume (Cubic content)', 'Geometry, Solid', 'Prisms']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_7zph9bkq/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75093"
"fod100075092","","Nets of Prisms. Geometry-Three-Dimensional Geometry","","7 min 33 sec","['Geometry-Three-Dimensional Geometry']","In this video we'll learn how to draw the nets of right rectangular prisms, including the net of a cube. A net is just the shape of the two-dimensional piece of paper that can be folded into a three-dimensional figure.","stream","[]","[]","['Geometry, Solid', 'Prisms']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_xwy3bt9q/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75092"
"fod100075091","","Equation, Center and Radius, and Intercepts of a Circle. Geometry-Circles","","6 min 47 sec","['Geometry-Circles']","In this video we'll learn how to find the equation of a circle, the center and radius of a circle, and the intercepts of a circle (the points at which the circle intercepts the x-axis and y-axis). We'll talk about circles that are centered at the origin, as well as circles that have shifted centers.","stream","[]","[]","['Circle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_8u0952d4/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75091"
"fod100075090","","Intersecting Chords. Geometry-Circles","","4 min 0 sec","['Geometry-Circles']","In this video we'll learn about what happens when two chords intersect each other inside a circle. Remember that a chord is just a line segment that has its endpoints on the circle. When two chords intersect each other, each chord is divided into two segments. If we multiply the lengths of each segment together, the products will always be equal.","stream","[]","[]","['Circle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_0pfj63kq/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75090"
"fod100075089","","Intersecting Tangents and Secants. Geometry-Circles","","6 min 51 sec","['Geometry-Circles']","In this video we'll learn how to find congruent angles between intersecting tangent lines, intersecting secant lines, or an intersecting tangent and secant line of a circle.","stream","[]","[]","['Geometry, Plane', 'Circle', 'Congruences (Geometry)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_k1n38eii/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75089"
"fod100075088","","Vertex on, Inside and Outside the Circle. Geometry-Circles","","12 min 14 sec","['Geometry-Circles']","In this video we'll learn how find angle measures between intersecting secant and tangent lines of a circle, when the intersection of these lines (the vertex) lies on the circle, inside the circle, and outside the circle.","stream","[]","[]","['Angles (Geometry)', 'Circle']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_e5bzajwt/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75088"
"fod100075087","","Inscribed Angles of Circles. Geometry-Circles","","8 min 35 sec","['Geometry-Circles']","In this video we'll learn how to measure inscribed angles of circles, which are angles that have their vertex on the circle, and their sides as chords of the circle.","stream","[]","[]","['Angles (Geometry)', 'Circle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_petuizor/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75087"
"fod100075086","","Tangent Lines of Circles. Geometry-Circles","","7 min 58 sec","['Geometry-Circles']","In this video we'll learn how to use what we know about the tangent line of a circle (the line that touches the circle at a single point) to figure out the signal range of a cell phone tower.","stream","[]","[]","['Circle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_hk8p4mep/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75086"
"fod100075085","","Arc Length. Geometry-Circles","","6 min 9 sec","['Geometry-Circles']","In this video we'll learn how to find the length of an arc, which is part of the perimeter of a circle. We'll use the formula for arc length, which requires us to know the degree measure of the interior angle and the radius of the circle.","stream","[]","[]","['Circle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_xoqunae4/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75085"
"fod100075084","","Degree Measure of an Arc of a Circle. Geometry-Circles","","6 min 49 sec","['Geometry-Circles']","In this video we'll learn how to find the degree measure of an arc. If the arc is the intercepted arc of an interior angle of the circle, then the degree measure of the arc is the same as the degree measure of the interior angle.","stream","[]","[]","['Circle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_2iw8gm64/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75084"
"fod100075083","","Circumference of a Circle. Geometry-Circles","","5 min 25 sec","['Geometry-Circles']","In this video we'll learn how to find the circumference of a circle, which is the same as the perimeter of the circle. The only value we need to find the circumference is the length of the radius.","stream","[]","[]","['Perimeters (Geometry)', 'Circle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_f6go9mjn/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75083"
"fod100075082","","Area of a Circle. Geometry-Circles","","8 min 32 sec","['Geometry-Circles']","In this video we'll learn how to find the area of a circle, or areas of figures involving circles. If we know the radius of a circle, then we can find its area.","stream","[]","[]","['Area measurement', 'Circle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_rrfwqk5n/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75082"
"fod100075081","","30-60-90 Triangles. Geometry-Triangles","","10 min 6 sec","['Geometry-Triangles']","In this video we'll learn about the special properties of 30-60-90 triangles, which are triangles that have interior angle measures of 30 degrees, 60 degrees, and 90 degrees. With these kinds of triangles, there's always a special relationship between the side lengths.","stream","[]","[]","['Angles (Geometry)', 'Triangle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_95cp0hzo/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75081"
"fod100075080","","45-45-90 Triangles. Geometry-Triangles","","10 min 53 sec","['Geometry-Triangles']","In this video we'll learn about the special things that happen in the specific instance of a 45-45-90 triangle, which is a triangle whose three interior angles are 45 degrees, 45 degrees, and 90 degrees. This triangle, by definition, is an isosceles triangle, and it's one half of a square, split on the square's diagonal.","stream","[]","[]","['Angles (Geometry)', 'Triangle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_vu7l4cyk/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75080"
"fod10007508","","The Trouble with Malaria","","49 min 29 sec","[]","Malaria infection rates are increasing each year. The migration of infected people to the West has caused the disease to spread. Our abuse of the environment and improper use of malaria drugs have enhanced its resistance to treatment. This program, hosted by David Suzuki, examines the problem and what health officials are doing to combat more virulent strains. Efforts by the American military are detailed at the Mai La refugee camp in Thailand-epicenter of the world's deadliest drug-resistant strain. (46 minutes)","stream","[]","[]","['Pathogenic bacteria', 'Human anatomy', 'Diseases', 'Life sciences', 'Human biology', 'Public health', 'Drugs', 'Self-care, Health', 'Epidemiology', 'Health behavior', 'Health', 'Communicable diseases', 'Human body', 'Medical care']","[]","https://cfvod.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_otgcb2vp/version/100012/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7508"
"fod100075079","","Pythagorean Inequalities. Geometry-Triangles","","5 min 13 sec","['Geometry-Triangles']","In this video we'll learn how to use pythagorean inequalities (inequalities derived from the pythagorean theorem) to say whether or not the triangle with the given side lengths is a right triangle, and acute triangle, or an obtuse triangle.","stream","[]","[]","['Pythagorean theorem', 'Triangle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_swnozitx/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75079"
"fod100075078","","Finding Perimeter Using the Pythagorean Theorem. Geometry-Triangles","","5 min 6 sec","['Geometry-Triangles']","In this video we'll learn how to use the pythagorean theorem to find the lengths of the sides of a right triangle, and then add the side lengths together to find the perimeter of the triangle.","stream","[]","[]","['Pythagorean theorem', 'Triangle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_gw6iq9pt/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75078"
"fod100075077","","Pythagorean Theorem. Geometry-Triangles","","3 min 7 sec","['Geometry-Triangles']","In this video we'll learn how to use the pythagorean theorem, which is a theorem that applies only to right-triangles (triangles that include a 90-degree angle). The pythagorean theorem tells us that the sum of the squares of the lengths of the legs is equal to the sum of the length of the hypotenuse (the longest side).","stream","[]","[]","['Pythagorean theorem', 'Triangle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_lzwv2855/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75077"
"fod100075076","","Area of a Triangle. Geometry-Triangles","","5 min 16 sec","['Geometry-Triangles']","In this video we'll learn how to find the area of a triangle. Since a triangle is always half of a parallelogram, the area of the triangle can be found by multiplying the width by the height, and then dividing by 2.","stream","[]","[]","['Area measurement', 'Triangle', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_j9vbhebm/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75076"
"fod100075075","","Area of a Trapezoid. Geometry-Quadrilaterals","","7 min 20 sec","['Geometry-Quadrilaterals']","In this video we'll learn how to find the area of a trapezoid, which is just a quadrilateral in which two of the opposite sides are parallel, and the other two opposite sides are not parallel. To find the area, we'll take the average length of the two parallel sides (the bases), and multiply by the height of the trapezoid.","stream","[]","[]","['Trapezoid', 'Area measurement', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_zgf2zejz/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75075"
"fod100075074","","Area of a Parallelograms. Geometry-Quadrilaterals","","4 min 55 sec","['Geometry-Quadrilaterals']","In this video we'll learn how to find the area of a parallelogram, which is a quadrilateral (a four-sided figure), in which opposite sides are parallel. A rectangle is a parallelogram that has four 90-degree interior angles. Since the triangles on each end of the parallelogram can be moved to the same side, turning the parallelogram into a rectangle, we'll use the same formula to find the area of the parallelogram as we would to find the area of a rectangle.","stream","[]","[]","['Area measurement', 'Parallelograms', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_52amzqa6/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75074"
"fod100075073","","Perimeter of a Rectangle. Geometry-Quadrilaterals","","7 min 32 sec","['Geometry-Quadrilaterals']","In this video we'll learn how to find the perimeter of a rectangle. Remember that 'perimeter' is just the distance around the outside of the rectangle. Since a rectangle is a quadrilateral with four interior right-angles, that means that opposite sides of the rectangle have the same length, so we can multiply the width by 2, and multiply the length by 2, and then add those products together to get the rectangle's perimeter.","stream","[]","[]","['Rectangles', 'Perimeters (Geometry)', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_sdrwkxyx/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75073"
"fod100075072","","Area of a Rectangle Using Sums and Differences. Geometry-Quadrilaterals","","2 min 46 sec","['Geometry-Quadrilaterals']","In this video we'll learn how to find the area of a figure that's the compilation of multiple rectangles, by finding the area of the larger rectangle and subtracting out part of the area, or by finding the areas of the smaller rectangles and then adding them together.","stream","[]","[]","['Area measurement', 'Rectangles', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_2p3qkybk/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75072"
"fod100075071","","Area of a Rectangle. Geometry-Quadrilaterals","","8 min 47 sec","['Geometry-Quadrilaterals']","In this video we'll learn how to find the area of a rectangle. Since a rectangle is a quadrilateral with four interior right-angles, we'll just multiply the length of the rectangle by the width of the rectangle in order to find its area.","stream","[]","[]","['Area measurement', 'Rectangles', 'Geometry, Plane']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/thumbnail/entry_id/0_yuvknlrq/width/320/type/1/vid_sec/3","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75071"
"fod100075070","","Denmark's Renewable Energy and Community 'Magician'. Søren Hermansen","","1 hr 1 min 13 sec","[]","This episode of the Green Interview features Søren Hermansen, Denmark's ""world-class energy magician"" whose a mission is to demonstrate it's possible to create a sustainable society based on renewable energy. The model society-Hermansen's native Samsø- is a small, blustery island nestled in Denmark's Kattegat Strait, once a cluster of farming communities powered by coal and oil, now an impressive showcase of sustainable power: wind turbines, district heating plants, rapeseed oil tractors and solar panels. In 1997, the Danish government put out a challenge to 5 of the country's populated islands to reduce their carbon footprint and increase production of renewable energy. The Municipality of Samsø entered and won the contest, but it had to be done with ""proven technologies, current policies and widespread public participation,"" says Hermansen.","stream","[]","['Denmark']","['Renewable resource integration', 'Carbon dioxide mitigation']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_g00x4hoh/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75070"
"fod100075069","","Seeking Justice on Behalf of the Environment. Antonio Oposa Jr","","1 hr 15 min 45 sec","[]","This episode of the Green Interview features Antonio Oposa Jr., one of Asia's pioneering activist lawyers in the arena of environmental law. Hailing from the Philippines, Oposa is best known for the David and Goliath battles he's waged against the Philippines government. With flawless legal maneuvering, he has effectively managed to protect forest and marine areas in his native country and is probably best known for establishing the principle of inter-generational responsibility, also known as the ""Oposa Doctrine""-the idea that the present generation has a responsibility to protect the environment for future generations.","stream","[]","['Philippines']","['Environmental law', 'Conflict of generations', 'Environmental justice']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_o1nyiszl/version/100011/acv/191/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75069"
"fod100075067","","Fighting for a Community's Legal Right to say No to Development. Thomas Linzey and Mari Margil","","1 hr 31 min 16 sec","[]","This episode of the Green Interview features Thomas Linzey and Mari Margil of the Community Environmental Legal Defense Fund (CELDF), a non-profit, public interest law firm providing free and affordable legal services for communities facing threats to their local environment. CELDF has assisted more than 110 local governments in the U.S., as well as the governments of Nepal, India, and Ecuador. It was a founding member of the Global Alliance for the Rights of Nature, and a co-author of the Universal Declaration for the Rights of Mother Earth.","stream","['Linzey, Thomas']","[]","['Environmental law']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_0hch6e6w/version/100001/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75067"
"fod100075066","","Ecuador, the Yasuní-ITT Initiative, and the Rights of Mother Nature. Alberto Acosta","","35 min54 sec","[]","This episode of The Green Interview features Alberto Acosta, an Ecuadorian economist and the country's former minister of energy and mining. Acosta was also the driving force behind the groundbreaking Yasuní-ITT Initiative, an offer by Ecuador to fight climate change by forgoing oil exploration and production in a large tract of untouched rainforest. Acosta is also the ex-president of the Constituent Assembly charged with drawing up the now famous Montecristi Constitution, which took effect in 2008 and established protection for the rights of nature. Acosta ran unsuccessfully against Rafael Correa for president in 2013-one of 8 presidential candidates-and is currently a researcher at FLASCO-Ecuador (Latin American Faculty of Social Sciences) and a vocal critic of Correa.","stream","['Acosta, Alberto', 'Parque Nacional Yasuní (Ecuador)', 'Yasuní-ITT (Initiative)']","['Ecuador']","['Nature conservation', 'Rain forest conservation']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_8mkx19m9/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=75066"
"fod100007504","","Don Quixote. Legacy of a classic","[2005], c1995","58 min","[]","This program weaves art, music, and literature with Western culture to explore the enormous impact of Cervantes' classic on our world today. Artists, critics, and others, from novelist Carlos Fuentes to General Norman Schwarzkopf, reveal how the work-the most translated in history-has affected their lives. Mixing discussions of the text with music, poems, other writings influenced by Don Quixote, and clips from the many film versions of the work, the program explores the conflict between imagination and reality, masculine and feminine attitudes toward love, and other themes. This is a rich resource for the study of Don Quixote and of the influence of art on life.","stream","[]","[]","['Spanish drama', 'Spanish literature', 'Literature']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_vpcya298/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7504"
"fod100007501","","Pocahontas. Her True Story","[2013], c1995","50 min","[]","As the tale goes, Pocahantas, age 12, saved the gallant John Smith from the ""savages"" in her tribe. The relationship blossomed into love, and Pocahontas went with Smith to London, where British society undoubtedly perceived her as an exotic creature. This program holds that legend up to historical scrutiny by examining questions such as: How gallant was John Smith? Who were these so-called ""savages""? How could Pocahontas, from a culture with strict hygienic standards, possibly have tolerated Smith's Elizabethan aversion to bathing? And, what of her marriage to John Rolfe? Interviews with Pocahontas' descendants provide a new perspective on the life and times of this revered Native American heroine.","stream","['Pocahontas']","['America', 'United States']","['Indians of North America', 'American literature']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_s0yi0qcn/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7501"
"fod100000748","","Euripides. Medea","[2005], c1982","87 min","[]","This is the stunning Kennedy Center production of Euripides' great classic about a woman driven by emotion beyond the brink of rationality. With Zoe Caldwell as Medea and Judith Anderson as the nurse. The English text is by Robinson Jeffers.","stream","['Euripides']","[]","['Medea (Greek mythology)', 'Greek drama']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_lf7kz4lh/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=748"
"fod100007476","","The Blind watchmaker. Evolutionary ideas of Richard Dawkins","[2006], c1987","49 min","[]","British biologist Richard Dawkins is blunt in his support for evolutionary theory as opposed to ""special creationism. This program, inspired by Dawkins' book, allows each side to present its best arguments-with some bias toward Darwinian evolution. The evidence is well-organized and current. Creationist ideas are vividly contrasted with contradictory data through observation, computer simulations, robotics, experiments, and close examination of designs in nature. The central argument here is that the diversity we see in such complex adaptations as the eye and insect mimicry can best be explained by cumulative natural selection over long periods of time.","stream","[]","[]","['Human beings', 'Biodiversity', 'Primates']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_ltq2zchx/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7476"
"fod100007472","","Keyhole surgery. Laparoscopic and arthroscopic techniques","[2008], c1989","30 min","[]","This program takes viewers into the fascinating world of laparoscopic and arthroscopic surgery. Looking over the shoulders of several pioneering doctors, we see how once-major operations are being replaced with simpler, less painful procedures. Several ""minimally invasive"" surgeries are shown, including knee cartilage repair, gallstone removal, balloon angioplasty, and others.","stream","[]","[]","['Surgery, Operative']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_tjz6rngx/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7472"
"fod100007467","","The Emerging viruses","[2006], c1991","50 min","[]","Scientists have identified over 200 viruses, and an estimated 1,000 more may lurk undiscovered throughout the world. This program examines current scientific research on emerging viruses. Live-action microscopy shows the impact of the HIV virus on the human immune system. Sophisticated animation depicting viral life cycles reinforces the concept that the best defense against dangerous viruses may well be a more complete understanding of how they work.","stream","[]","[]","['Diseases', 'Medical microbiology', 'Self-care, Health', 'Communicable diseases', 'Infection']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_8kt53jxb/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7467"
"fod100007466","","The Estrogen effect. Assault on the male","[2006], c1993","53 min","[]","Will environmental changes brought about by humans eventually destroy the potential for males of all species to reproduce? This Emmy Award-winning documentary explores that frightening possibility. Using sophisticated investigative techniques, scientists trace the ripple effect of estrogenic compounds in the environment. At first, we observe slight changes in the natural order, then witness the wider effects: seriously altered ecosystems and the disruption of fundamental life processes that result in reduced male reproduction. The dismal conclusion is that the process, unabated, may result in male sterility over time.","stream","[]","[]","['Environmental sciences']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_jz2p4v2t/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7466"
"fod100007465","","A Human life emerges","[2006], c1995","35 min","['Reproduction']","Human reproduction is a fascinating and complex process, especially when seen microscopically. This program presents a close-up view of reproduction, beginning with the fertilization of the female egg, through gestation and the millions of cell divisions, and culminating in the birth of a fully formed individual. Each stage of the development is visualized in sequence: when the heart begins to beat, when the limbs develop, when the child first moves and responds to stimuli, and when it offers its first cry to the world at the moment of birth. Sophisticated computer animation and technical narration are used throughout in an effort to explain the gestation and birth processes for the advanced learner.","stream","[]","[]","['Embryology', 'Man-woman relationships', 'Reproductive health', 'Human reproduction', 'Generative organs', 'Childbirth', 'Labor (Obstetrics)', 'Pregnancy', 'Reproduction', 'Genetics']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_ezx7culj/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7465"
"fod100007464","","Human reproductive biology","[2008], c1994","35 min","['Reproduction']","For most couples, getting pregnant is an easy matter, but not so for the 15 percent with infertility problems. This highly technical program designed for advanced anatomy courses and health-care practitioners focuses on the processes that lead to normal impregnation, and the physical hindrances that can prevent it. Superb microscopy and computer animation illustrate the processes, and show how reproductive medicine helps infertile couples over biological hurdles. The various fertilization techniques illustrated include synthetic stimulation of hormones, in vitro fertilization, micro-insemination, and test-tube embryo transfer to the womb. How diseases of the uterine lining and OAT syndrome can disrupt impregnation is discussed and illustrated.","stream","[]","[]","['Embryology', 'Man-woman relationships', 'Reproductive health', 'Human reproduction', 'Families', 'Pregnancy', 'Reproduction', 'Genetics']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_6edx05rw/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7464"
"fod100074622","","Moods, Inspiration, and the Mind","","24 min8 sec","['MINDWORKS']","Usually, you feel sad when you get into a fight with a friend, nervous before a big test or interview, and happy when you win at a contest or see a long-lost friend. In your mind, you might think you are in control of what you feel because you understand the causes of those feelings. But a lot more goes on inside your brain! As time passes, our brain gathers more information about who we are. The irony is, we often change as well, so the information about you changes too. You be sure though, that your subconscious brain keeps everything!","stream","[]","[]","['Brain', 'Personality development', 'Loss (Psychology)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_l80no007/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74622"
"fod100074621","","Muscle Memory","","24 min6 sec","['MINDWORKS']","Puppeteers use strings to control their movements. We, on the other hand, are manipulated by the brain. The brain is the center of the nervous system of almost all vertebrate and invertebrate animals. The brain is in charge of controlling all the organs in the body. It generates patterns of muscle activity and promotes secretion of chemicals called hormones. This central control is what enables a quick and coordinated response to changes in the environment.","stream","[]","[]","['Brain', 'Central nervous system']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_crtzxiu1/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74621"
"fod100074620","","Fooling the Tongue and the Nose","","24 min7 sec","['MINDWORKS']","There are so many different tastes and flavors. Sweet, sour, salty. Our tongue can encounter so many different types of food, especially if we're adventurous. Taste cells in our mouth and throat form taste buds. These isolated taste buds are scattered on the surface of our palate and our throat. Our tongue and nose are very significant organs, allowing us to enjoy the many great things life has to offer. The truth is, it affects more than just our biological needs. It affects even our memories and emotions.","stream","[]","[]","['Taste buds', 'Sensory discrimination', 'Flavor', 'Thought and thinking']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_sw72jojc/version/100001/acv/141/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74620"
"fod100074619","","Illusions of Touch","","24 min5 sec","['MINDWORKS']","Rough, soft, smooth, cold, or warm. We encounter so many different textures and sensations on a daily basis. Our sense of touch is able to recognize a lot of things, even when we don't use our eyes. But how does touch connect to our brain? FMRI studies show, that touch has a wide impact on the brain. It influences our sensations, movements, and thought processes, as well as our ability to learn new movements.","stream","[]","[]","['Sensory discrimination', 'Touch', 'Thought and thinking']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_d5t2jjjy/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74619"
"fod100074618","","Memory","","24 min4 sec","['MINDWORKS']","What do you think determines how we make decisions-what we think, or what we feel? Our brain actually perceives and acts upon emotional stimuli. Emotions are a combination of cognitions, feelings, and actions, according to psychologists. So emotions are not just about what we feel but about how we process and respond to those feelings. Remember that even if our internal structures are virtually the same, we are all unique individuals!","stream","[]","[]","['Emotions', 'Personality development', 'Memory']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_sc8saj48/version/100011/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74618"
"fod100074617","","Mind Over Matter","","24 min7 sec","['MINDWORKS']","Thanks to our brain, we have access to things that we have experienced in the past. It's like having our own personal photo and video album, which we can view and replay whenever we want. From the time we were born, we have been collecting several memories and learning various skills. Over time, all these new things we've absorbed make up who we are-even the dreams we experience when we sleep! The combination of all of these things creates our unique personalities, which, even if similar to others, can never be duplicated.","stream","[]","[]","['Brain', 'Personality development', 'Memory', 'Neuroplasticity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_4nuy3rpv/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74617"
"fod100074616","","Everyday Illusions","","24 min6 sec","['MINDWORKS']","Unconscious inference, or unconscious conclusion, is part of a theory on visual perception that says that human vision is incomplete and details are inferred by the unconscious mind to create a complete picture. It's like our brains are adapting to the loss, and it is filling in the blanks, sort of like a 'connect the dots' game. The world has provided us with a lot of existing forms of magical illusions. Sometimes, we don't always notice them. Some of them, we probably see every day.","stream","[]","[]","['Visual perception', 'Subliminal perception', 'Thought and thinking']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_zrm0wwf2/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74616"
"fod100074615","","Auditory Illusions","","24 min7 sec","['MINDWORKS']","If there are optical illusions that trick your eyes, there are also some auditory illusions that play with sound. Or rather, use sound to play with you! Can you imagine sound being able to affect how you feel? Some sounds will make you feel as if you are being moved-literally! The ranges of sound that surround us every day are infinite. Sometimes we are so used to hearing them, that nothing seems unusual. But by learning new ways to hear-and listen-we open up a new world and the results are incredible!","stream","[]","[]","['Sensory discrimination', 'Thought and thinking', 'Auditory perception']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_5cenydfc/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74615"
"fod100074614","","Altered Views","","24 min5 sec","['MINDWORKS']","You've probably played a game of hide and seek at least once in your lifetime. Somebody closes their eyes; counts to ten, while the rest of the players go out and hide. Usually, they stay in places where they can remain unseen; it would be quite difficult for them to hide while in plain view, right? It is fun to learn that there are various ways to manipulate our views, and at times we can hardly believe our eyes. Who knew, all it may take are a few tricks to alter our perception!","stream","[]","[]","['Visual perception', 'Sensory discrimination', 'Thought and thinking']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_tml2lwir/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74614"
"fod100074613","","Visual Deceptions","","24 min6 sec","['MINDWORKS']","Do you believe in ghosts, or do you think these supernatural beings are a figment of one's imagination? Psychologically speaking, are they just hallucinations? Whether or not these entities truly exist cannot exactly be proven. While most of these illusions are a result of how our brain and eyes respond to each other, we have also learned to create many tricks through science, technology, and art. It is fascinating to discover and relearn these old tricks, especially when they are given a modern twist. Who knew that the hi-tech visual illusions that impress us now where invented many years ago and who knows what else we will discover in the years to come.","stream","[]","[]","['Brain', 'Visual perception', 'Hallucinations and illusions']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_6cp3z2ac/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74613"
"fod100074612","","Visual Perception","","24 min4 sec","['MINDWORKS']","From the moment you wake up, eat your breakfast, go through your day until you reach bedtime, you see millions of different images-different sizes, different colors. Why do we see what we do? And how sure are we that what we are seeing is actually true or is it affected by something else? You'll never know what is hiding behind or beneath the images that you see. It may be true that first impressions last, but remember, they aren't always right!","stream","[]","[]","['Visual perception', 'Visual discrimination']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_2lbmkuds/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74612"
"fod100074611","","Our Amazing Brain","","24 min7 sec","['MINDWORKS']","No matter how small the act-whether it's tying your shoe, or pressing a button, it's all orchestrated by a complex system of nerves and what we call ""gray matter"". While we think all our actions are random, these are actually a result of an intricate mental process. It is fun to discover how shapes, color, and perspective can change a lot about the way we see things or fail to see things, for that matter. One thing's for sure, we have one amazing brain!","stream","[]","[]","['Central nervous system', 'Periaqueductal gray matter']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_dzw00rr1/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74611"
"fod100074610","","The Brain Eye Process","","24 min13 sec","['MINDWORKS']","Chocolate or vanilla? Push or pull? We make different decisions every day. Our genetic makeup is more or less the same, so how come we act differently from one another? What triggers our actions and reactions, our thoughts and emotions? How exactly does the mind work? Every day we encounter different objects, sights, colors, shapes, and images. Sometimes, things are not what they appear to be. Before you think it's magic-think again. Is it just your brain playing tricks on you? Never underestimate the power of the mind!","stream","[]","[]","[]","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_uxcozdue/version/100011/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74610"
"fod100074608","","Remember This","","49 min59 sec","['Brain Games (Season 1)']","Our experts are on a mission - to find out where memories reside in the brain - and they're examining every millimeter for clues.","stream","[]","[]","['Brain', 'Neuropsychology', 'Memory', 'Neuroplasticity']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_72l62gn0/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74608"
"fod100074606","","Watch This","","50 min sec","['Brain Games (Season 1)']","Hack into the ultimate supercomputer - the human brain - as Hollywood filmmakers create mind-bending sensory illusions.","stream","[]","[]","['Visual perception', 'Sensory discrimination', 'Neuropsychology', 'Magic tricks']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_vfbfe4oe/version/100001/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74606"
"fod100074605","","Pay Attention","","50 min1 sec","['Brain Games (Season 1)']","When it comes to mastering - and manipulating - attention, some of the world's leading experts aren't scientists. They're magicians.","stream","[]","[]","['Neuropsychology', 'Magicians', 'Tricks']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_b9z8ztuw/version/100001/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74605"
"fod100074597","","The Borrowers, Series 1—Part 5","","29 min 33 sec","['The Borrowers']","When you're only 15cm high the world is a pretty frightening place! Meet Pod, Homily and Arrietty Clock - those tiny people who live under your floorboards. They exist by 'borrowing' everyday items from you that you wouldn't even miss! You will never know they're there unless they're careless and let you see them one day. That's why their lives are filled with danger and great adventures. So the next time you notice a doll's teacup missing or an old cotton reel gone astray, you might like to lift your floorboards and say hello to the Borrowers. A BBC Production.","stream","[]","[]","['Irish literature', 'Language arts', 'British literature']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_statsowb/version/100011/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74597"
"fod100074594","","Deutsch Plus. Part 13","","13 min 57 sec","['Deutsch Plus']","Deutsch Plus is a German language series for intermediate students. Anna and Ulli help Nico look for apartment listings. Ulli suggests he rent a room in a house with a German family. Anna and Nico make an appointment to see a room, but the owner refuses to rent to Nico because he’s a foreigner. Nico practices his past tense verb conjugations. Frau Weiss makes a deal with the police to film when they arrest the drug dealer at his next meeting with Nico. Anna and Nico have dinner and talk about their childhoods. A BBC Production.","stream","[]","[]","['Language, Universal', 'German language']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_9c0nz8mt/version/100011/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74594"
"fod100074593","","Meat Eaters. David Attenborough's Life of Mammals","","49 min 38 sec","[""David Attenborough's Life of Mammals""]","In this documentary, David Attenborough examines adaptations, lifestyles, and hunting strategies of the two main carnivore groups: cats and dogs. In the far north, the arctic fox hunts during summer and buries surplus food to survive the winter. In southern climates, leopards and tigers have become solitary hunters relying on stealth and surprise to catch their next meal. Wolves and lions work in teams and family groups to tackle larger prey and protect their young. Hyenas share domestic duties and “communicate” by marking their territory. Communal life is strictly controlled by alpha pairs to maintain hunting efficiency—crucial for group survival. A BBC Production.","stream","[]","[]","['Morphology', 'Animals', 'Life sciences', 'Anatomy, Comparative', 'Sexual behavior in animals', 'Behavior', 'Morphology (Animals)', 'Animal behavior', 'Zoology']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_l1br1tzl/version/100001/acv/191/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74593"
"fod100074592","","Life in the Trees. David Attenborough's Life of Mammals","","49 min 40 sec","[""David Attenborough's Life of Mammals""]","David Attenborough takes us up close, climbing high into the canopy himself, to meet mammals that have adapted to living in treetops. Meerkats regularly climb small trees to scout for danger, while gibbons live one hundred feet or more above the forest floor. ""Life in the Trees"" is full of strange and unfamiliar animals, such as the Indian slender loris and the fossa, Madagascar's largest arboreal predator, both filmed for the first time in the wild. A BBC production.","stream","[]","[]","['Morphology', 'Animals', 'Life sciences', 'Anatomy, Comparative', 'Sexual behavior in animals', 'Biodiversity', 'Evolution (Biology)', 'Behavior', 'Morphology (Animals)', 'Animal behavior', 'Animal diversity', 'Zoology']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_kpjx4w4r/version/100011/acv/211/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74592"
"fod100074591","","Insect Hunters. David Attenborough's Life of Mammals","","49 min 38 sec","[""David Attenborough's Life of Mammals""]","In this documentary, David Attenborough examines descendants of the first mammals to develop during the dinosaur age. By eating insects, they were able to extend their territory and adapt to water and flight habitats. Shrews closely resemble their ancestors, and imitate their foraging hunting techniques. Moles have moved underground, and elephant shrews evade predators by sprinting through a well maintained trail network. Insect hunters that grew too big to hide developed armor and spines, such as the hedge hog, armadillo, and pangolin. David visits a giant anteater in Brazil to learn about its termite harvesting strategy, and observes bats using sonar to detect prey in flight. Finally, he meets a New Zealand bat species that has taken to foraging on the ground as its shrew ancestors once did—suggesting evolution is reversing itself. A BBC Production.","stream","[]","[]","['Morphology', 'Animals', 'Life sciences', 'Anatomy, Comparative', 'Sexual behavior in animals', 'Biodiversity', 'Evolution (Biology)', 'Behavior', 'Morphology (Animals)', 'Animal behavior', 'Animal diversity', 'Zoology']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_nvkpf10i/version/100001/acv/191/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74591"
"fod100074590","","Chisellers. David Attenborough's Life of Mammals","","49 min 39 sec","[""David Attenborough's Life of Mammals""]","Rodents like rats, mice and squirrels are the most numerous mammals on the planet. In this documentary, David Attenborough reveals how their chisel-sharp front teeth help them to make homes, live underground, store food, and breed prolifically. He looks at agouti, desert kangaroo rat, grey squirrel, and naked mole-rat food collection techniques; marmot hibernation; beaver dam construction; porcupine and ground squirrel defense strategies; mouse reproduction; Patagonian mara social behavior; and capybara water adaptation features.","stream","[]","[]","['Animals', 'Life sciences', 'Sexual behavior in animals', 'Biodiversity', 'Evolution (Biology)', 'Behavior', 'Animal behavior', 'Animal diversity', 'Zoology']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_xudtldpy/version/100011/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74590"
"fod100074589","","A Winning Design. David Attenborough's Life of Mammals","","49 min 39 sec","[""David Attenborough's Life of Mammals""]","The warm blooded, furry, milk producing mammalian body is a winning design. In this film, David Attenborough looks at why mammals are the most successful creatures on the planet. He journeys to Australia to studyechidnas and platypus, rare egg-laying species. He looks at how marsupials have adapted to a range of habitats across the continent, highlighting kangaroos, koalas, and wallabies, as well as smaller species. Then he travels to the Amazon to learn about water opossums and canopy marsupials. Finally, he introduces placental mammals through a wildebeest birth on the African plains, and explains differences between womb and pouch development. A BBC Production.","stream","[]","[]","['Morphology', 'Animals', 'Animal diversity', 'Life sciences', 'Anatomy, Comparative', 'Sexual behavior in animals', 'Biodiversity', 'Evolution (Biology)', 'Behavior', 'Morphology (Animals)', 'Animal behavior', 'Zoology']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_anlp9ct7/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74589"
"fod100074581","","Deutsch Plus. Part 20","","13 min 9 sec","['Deutsch Plus']","Deutsch Plus is a German language series for intermediate students. Herr Schiller watches a documentary about German soap operas. Nico’s job interview goes well and he is offered a graphic design position at D Plus. Frau Weiss has a goodbye party and her replacement director, Sara Mende, flirts with Dieter. Nico’s coworkers join him for a birthday celebration on a river boat cruise. A BBC Production.","stream","[]","[]","['Language, Universal', 'German language']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_vmgjo3q3/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74581"
"fod100074580","","Deutsch Plus. Part 19","","14 min 29 sec","['Deutsch Plus']","Deutsch Plus is a German language series for intermediate students. Nico and Anna discuss the police search for the drug dealer on the way to her parent’s house. They stop for gas. Anna’s parents welcome Nico and they have lunch. Anna’s mother asks him about his injuries and her father watches a TV program on German historical figures in the Regensburg Walhala Memorial and Russian Jewish immigrants in Straubing. A BBC Production.","stream","[]","[]","['Language, Universal', 'German language']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_5q0q1d45/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74580"
"fod100074579","","Deutsch Plus. Part 17","","14 min 23 sec","['Deutsch Plus']","Deutsch Plus is a German language series for intermediate students. Nico moves in with Ulli’s friends Marlene and Georg—but the drug dealer follows him. Marlene invites Anna, Ulli, and Nico to tea and they discuss exercise. Later, Nico watches a program on former East German artists and learns about comparative adjectives. He tells Anna he loves her after they go swimming. A BBC Production.","stream","[]","[]","['Language, Universal', 'German language']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_qpm1cho4/version/100021/acv/191/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74579"
"fod100074578","","Deutsch Plus. Part 15","","13 min 30 sec","['Deutsch Plus']","Deutsch Plus is a German language series for intermediate students. Undercover police apprehend Nico and the drug dealer in Rheinpark; Frau Weiss films the event for Aktuell TV. After giving a statement, Nico returns to work at D Plus. Later, he and Anna watch a documentary on smuggling routes between Western and Eastern Europe—followed by Frau Weiss’ exposé. A BBC Production.","stream","[]","[]","['Language, Universal', 'German language']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_nn1zdfw1/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74578"
"fod100074577","","The Borrowers, Season 1- Part 2","","29 min 23 sec","['The Borrowers']","When you're only 15cm high the world is a pretty frightening place! Meet Pod, Homily and Arrietty Clock - those tiny people who live under your floorboards. They exist by 'borrowing' everyday items from you that you wouldn't even miss! You will never know they're there unless they're careless and let you see them one day. That's why their lives are filled with danger and great adventures. So the next time you notice a doll's teacup missing or an old cotton reel gone astray, you might like to lift your floorboards and say hello to the Borrowers. A BBC Production.","stream","[]","[]","['Irish literature', 'Language arts', 'British literature']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_dez8t4s2/version/100011/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74577"
"fod100074574","","War of the Worlds","","29 min 21 sec","['Alien Empire']","In this final program of the series the battle lines are drawn, insects - friends or foe?","stream","[]","[]","['Insects']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_5jvyil8i/version/100001/acv/191/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74574"
"fod100007453","","Double helix","[2005], c1987","108 min","[]","This fast-paced dramatization starring well-known actor Jeff Goldblum is about the race to solve one of the greatest mysteries of 20th-century science-the structure of DNA. It is the story of the diligent research, creative analysis, and perseverance of James Watson and Francis Crick that led to the discovery. With the help of their colleague, Maurice Wilkins, they also earned the 1962 Nobel Prize. Students of biology and genetics will benefit from the process of problem-solving used to identify the structure of DNA, as well as the clear, concise summary of research evidence.","stream","[]","[]","['Heredity, Human', 'Genetics']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_0vg35y43/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7453"
"fod100007443","","The Shakers. I Don't Want to Be Remembered as a Chair","[2013], c1995","50 min","[]","This unique and touching program opens the doors of America's last Shaker compound, where the religious sect's nine surviving members lead lives of equality, fraternity, decency, and-most notably-simplicity. That simplicity is reflected in Shaker furniture and basketry-items which now sell for thousands of dollars at auctions throughout the world. At one antique auction, hucksters peddle Shaker furniture to the rich and famous, as the Shakers ponder their legacy. Will they be remembered as austere people-pious and charitable and filled with wisdom-or simply as the makers of priceless ornaments?","stream","[]","[]","['Christianity', 'Shakers']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_kb4wkvop/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7443"
"fod100007441","","The Path of Chinese privatization","[2006], c1994","49 min","['The Giant Awakes']","Two Communist Party officials cruise the dusty streets of Ma Bei village in a new Cadillac. Welcome to China at the end of the 20th century. Fueled by profits from private businesses, the town is booming, while at a plant up the road thousands of workers, formerly protected under the communist system, may lose their jobs under privatization. Similar situations are developing all over China, and officials are worried that workers may revolt. So they've come up with a uniquely Chinese solution: industries will gradually phase in privatization, letting fear of worker unrest dictate the pace.","stream","[]","['China']","['Comparative government']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_ighcyxl6/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7441"
"fod100007440","","Human rights in China","[2006], c1994","49 min","['The Giant Awakes']","China is booming economically. U.S. companies, including Motorola and Boeing, are employing thousands in new factories. However, Western economic investment has not translated into a Chinese acceptance of Western ideas concerning human rights-as evident in the Tiananmen Square massacre. This program discusses the progress that is being made. We meet a radio talk-show host who invites callers to grill government officials, and newspaper editors who sometimes run pieces critical of the government's human rights record. And while China may have a ways to go in this respect, one Chinese official predicts, ""Full bellies and controlled political evolution will keep China on course [toward expanding human rights].","stream","[]","['China']","['Comparative government']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_9v4xnnh2/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7440"
"fod100007439","","Chinese capitalism. Moving the mountain","[2005], c1994","50 min","['The Giant Awakes']","From fledgling cottage industries to the Shanghai stock market, China represents a unique blend of communism and capitalism. This program studies that phenomenon by examining how the Chinese themselves are adapting to the quasi-free market system. Chinese economic modernization is studied at a shoe factory, where communist worker ideals and capitalist goals coexist. In the largest migration in history, 90 million rural Chinese have moved to cities in search of jobs, a better life, and a larger slice of the capitalist pie, only to find the gap between rich and poor widening each day. Corruption, say many, is rampant. The issue of how these trends will eventually affect China's stability is examined.","stream","[]","['China']","['International economic relations', 'Comparative government']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_sdj5lymp/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7439"
"fod100007433","","The Price of Racism","[2013], c1996","50 min","[]","This program brings viewers face-to-face with the mindless ugliness and irrevocable consequences of racism. Examining five case studies in which racism led to violence, we see how each act destroyed not only its victim, but others as well, including the perpetrator. Each case leaves in its wake a string of broken lives-strained marriages, financial ruin, psychologically traumatized adults and children. The inevitable conclusion is: hate destroys. Anyone tempted to take racism lightly will benefit from this program.","stream","[]","[]","['Racism', 'Ethics', 'Sexism', 'Cross-cultural studies', 'Sex discrimination', 'Ethnicity', 'Political sociology']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_xqnjoh0m/version/100002/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7433"
"fod100007431","","Fourteen days in May. Capital punishment debate","[2007], c1987","88 min","[]","In May 1987, Edward Johnson, a young African-American found guilty of murder and attempted rape, was executed at Parchman Penitentiary in Mississippi. This program, set in the days immediately preceding and following Johnson's death in the gas chamber, focuses on the legal mechanism for execution and the intense ethical debate surrounding it. Johnson is interviewed at length. Questions arising from that interview explore such issues as whether the death penalty is ever justified, whether it is disproportionately used against minorities, and whether legal avenues of appeal are sufficient, or overly-weighted in favor of criminals.","stream","[]","[]","['Corrections', 'Ethics', 'Deviant behavior', 'Social control', 'Philosophy', 'Criminal justice, Administration of', 'Political sociology']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_ku11yo1x/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7431"
"fod100007427","","Bones of contention. Native American archaeology","[2005], c1995","49 min","[]","The remains of more than 10,000 Native Americans unearthed at archaeological sites across the U.S. are in the possession of museums such as the Smithsonian. Is the analysis of the bones valid scientific research, or is it a desecration of Native American culture? This program focuses on the tensions between scientists, historians, and museum curators and Native American groups, as the bones take on a central role in a war of alternate perspectives. In examining this debate, the program provides an excellent survey of Native American archaeology in the U.S.","stream","[]","[]","['Archaeology', 'Indians of North America']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_4yx0kou7/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7427"
"fod100007426","","Artist Unknown. The Search for African History","[2013], c1995","50 min","[]","In this documentary, Lonnie James, a young British man of Trinidadian descent, journeys to the ancient African kingdom of Benin, located in present-day Nigeria, to discover the origins of a carved mask purchased in London. He uncovers a tale of early African civilization, the looting of treasures and suppression of traditions by colonial powers, and the amazing persistence of an African artistic vision within a colonial culture. His mission becomes a quest to better understand the essence of Africa itself. In an ultimate gesture of reconciliation with his African heritage, James leaves the prized mask in the place where it was created. A BBCW Production.","stream","[]","['Africa', 'Africa, Sub-Saharan']","['Islamic arts', 'Art, Middle Eastern', 'Art, African', 'Benin (Kingdom)']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_mur5ze8r/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7426"
"fod100007419","","The Ice cream wars","[2007], c1994","30 min","[]","This program examines how luxury ice cream companies are vying for their European market shares. A variety of strategies used by Haagen-Dazs are discussed. In Britain, a Haagen-Dazs executive explains how the company appealed to adult consumers by presenting ice cream as a sensual gourmet specialty, rather than a child's treat. Advertisements in Vogue and other upscale publications use sex and celebrities to boost sales. In France, stores selling the product are located in exclusive areas, such as the Champs-Elysees. But Haagen-Dazs's quest for classic brand status is now being threatened by American competitor Ben & Jerry's, England's Rocombe Farms, and other European premium brands. Executives from those companies discuss competitive marketing strategies that appeal to more traditional values.","stream","[]","[]","['Management', 'Leadership']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_waxj3gme/version/100001/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7419"
"fod100074167","","Light, Health and Habits","","2 min 59 sec","[]","Using wearable technology to track office workers' exposure to natural light, neurologists and sleep researchers are learning more about the importance of light to our health and our habits.","stream","[]","[]","['Mental illness', 'Human anatomy', 'Human growth', 'Posture', 'Human biology', 'Self-care, Health', 'Health behavior', 'Health', 'Human body', 'Hygiene', 'Nursing', 'People with mental disabilities']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_6ekbmjre/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74167"
"fod100074165","","Quicker Breast Cancer Treatment","","1 min 41 sec","[]","An experimental approach to treating breast cancer combines surgery and radiation therapy in one appointment, instead of multiple appointments over the course of several weeks.","stream","[]","[]","['Breast']","[]","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_iqa6w29w/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74165"
"fod100074164","","First Lady Of The Confederacy. An Intimate Conversation With Varina Howell Davis","","40 min41 sec","[]","When the Southern states seceded from the Union in 1861 to form their own nation with Jefferson Davis as President, his wife Varina became the second first lady, for the first and only time in American history. It was a position she accepted with dismay and held for almost the same length of time as her Union counterpart, Mary Todd Lincoln. Mrs. Lincoln is well remembered by history, but Mrs. Davis seems to be forgotten. This film tells Mrs. Davis' story from her own perspective in the form of a dramatized conversation held in New York City in 1901, the 40th anniversary of the Civil War. A compelling docu-memoir of an unusual life, it includes her take on secession, slavery, and war; reconciliation; financial difficulties; family life and loss; and pursuing a writing career in New York after Jefferson's death.","stream","['Davis, Varina']","['Confederate States of America', 'United States']","[""Presidents' spouses""]","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_2aezvmfb/version/100001/acv/171/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74164"
"fod100074163","","Why We Drop Out","","35 min27 sec","[]","In this video-mediated dialogue, seven students in rural Massachusetts discuss factors that led them to drop out of high school. A video of their intimate conversation is then shown to teachers, counselors, and administrators, whose reactions and responses are filmed and shown back to the students. This unique process allows participants on each level of the educational ladder to contribute to a personal and structural understanding of the many factors that derail students from graduating, such as getting held back, confrontation at school, trauma from bullying, and problems at home. The participants generate a number of solutions-based strategies, as each person has the space to be heard, to listen, and to respond. This Video Bridge and Screening Guide provide a springboard for further dialogue and problem solving in classrooms, schools, and districts across the country-particularly in rural areas-about how to help students succeed in finishing high school.","stream","[]","['Massachusetts']","['High school dropouts']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_ygpkddka/version/100001/acv/151/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=74163"
"fod100007399","","Unlocking the Secrets of Schizophrenia","[2013], c1996","21 min","[]","At least two million people will fall victim to schizophrenia in their lifetime-more men than women, according to statistics. This award-winning documentary goes straight to the National Institutes of Health to examine what causes schizophrenia and what some of the available treatments are. See how medications are researched and developed and how scientists, mental health advocacy groups, and government agencies are joining forces to improve the lives of people with schizophrenia. Senator Peter Domenici (R-NM) discusses specific government efforts aimed at dealing with the disorder.","stream","[]","[]","['Mental illness', 'Schizophrenia', 'Psychoses']","['Educational films']","https://cdnsecakmi.kaltura.com/p/1067292/sp/106729200/thumbnail/entry_id/0_ffc0osul/version/100001/acv/21/width/320","https://www.remote.uwosh.edu/login?url=https://fod.infobase.com/PortalPlaylists.aspx?wID=102638&xtid=7399"