Hyperbolic Integrals. Calculus-Integrals: Hyperbolic Integrals
Description
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.
Runtime
2 min 36 sec
Series
Subjects
Genre
Database
Films on Demand
Direct Link
Similar Films
Surface of Revolution Equation
Calculus II. Integration by parts. Level I
Cylindrical Shells, Vertical Axis. Example 2
Calculus II. Integration by parts. Level II
Part 2 of the FTC
Repeated Quadratic Factors. Calculus-Integrals: Partial Fractions. Example 2
Trigonometric Substitution Setup. Calculus-Integrals: Trigonometric Substitution
Repeated Linear Factors. Calculus-Integrals: Partial Fractions
Hyperbolic Derivatives. Calculus-Derivatives: Trigonometric Derivatives
Calculus tutor. Integration by substitution
Cylindrical Shells, Vertical Axis
Distinct Quadratic Factors. Calculus-Integrals: Partial Fractions. Example 2
Distinct Quadratic Factors. Calculus-Integrals: Partial Fractions. Example 3
Tan n, even n. Example 2
Trigonometry tutor. Finding trig functions using unit circle