Trigonometric Integrals and Derivatives

The use of trigonometric identities

The concept of variations and the chain rule

The importance of constant coefficients

The application of logarithmic functions

5 sin(5x) + C

sin(5x) + C

5 cos(5x) + C

cos(5x) + C

As cosine over sine

As sine over cosine

As a sum of sine and cosine

As a product of sine and cosine

Exponential function

Logarithmic function

Polynomial function

Trigonometric function

1/a sin(ax) + C

a sin(ax) + C

sin(ax) + C

cos(ax) + C

They simplify the integration process

They are always zero

They are given in tables of standard integrals

They are ignored in standard integrals

Applying the chain rule

Using logarithmic functions

Differentiating polynomials

Using trigonometric identities

Using trigonometric identities

Substitution

Integration by parts

Differentiation

Because it is a derivative

Because it is easier to integrate

Because it is squared

Because it is a constant

Cosine

Tangent

Sine

Logarithm