Integration Techniques and Trigonometric Identities

Solving a puzzle

Mixing primary colors

Cooking a meal

Building a house

sin(x)

tan(x)

1/cos(x)

cos(x)

Differentiation

Partial fractions

Matrix multiplication

Series expansion

Forgetting to change variables

Ignoring the limits of integration

Overlooking the reverse chain rule

Misquoting the partial fraction terms

t^2/2

1/t

log(t)

log(1+t)

It assumes t is positive

It ignores the reverse chain rule

It simplifies the expression incorrectly

It uses the wrong trigonometric identity

To change the variable

To solve differential equations

To simplify the expression

To find the derivative

tan^2(x) = sec^2(x) - 1

cos(2x) = cos^2(x) - sin^2(x)

sec(x) + tan(x)

sin^2(x) + cos^2(x) = 1

sin(x)

cos(x)

sec(x)tan(x)

tan(x)

It simplifies the integration

It introduces more variables

It requires more calculations

It makes the process longer