High School Calculus/Derivatives of Trigonometric Functions

In the following formulas the angle u is supposed to be expressed in circular measure.

$\frac{d}{d x} \sin u = \cos u$

$\frac{d}{d x} \cos u = - \sin u$

$\frac{d}{d x} \tan u = \sec^{2} u$

$\frac{d}{d x} \cot u = - \csc^{2} u$

$\frac{d}{d x} \sec u = \sec u \tan u$

$\frac{d}{d x} \csc u = - \csc u \cot u$

Proof for the derivative of $\sin u$

Let $y = \sin u$ ,

then

$y' = \sin (u + Δ u)$ ;

therefore

$Δ y = \sin (u + Δ u) - \sin u$ ;

In Trigonometry,

$\sin A - \sin B = 2 \sin \frac{1}{2} (A - B) \cos \frac{1}{2} (A + B)$

If we substitute $A = u + Δ u$ and $B = u$ ,

we have

$Δ y = 2 \cos (u + \frac{Δ u}{2}) s i n \frac{Δ u}{2}$

Hence

$\frac{Δ y}{Δ x} = \cos (u + \frac{Δ u}{2}) \frac{\sin \frac{Δ u}{2}}{\frac{Δ u}{2}}$

When $Δ x$ approaches zero, $Δ u$ likewise approaches zero, and as $Δ u$ is in circular measure, the limit of

$\frac{\sin \frac{Δ u}{2}}{\frac{Δ u}{2}}$

Hence

$\frac{d y}{d x} = \cos u$

Proof for $\frac{d}{d x} \cos u$

$\frac{d}{d x} \cos u = \sin u (- \frac{d u}{d x}) = - \sin u \frac{d u}{d x}$

Proof for $\frac{d}{d x} \tan u$

Since $\tan u = \frac{\sin u}{\cos u}$

$\frac{d}{d x} \tan u = \frac{\cos u \frac{d}{d x} \sin u - \sin u \frac{d}{d x} \cos u}{\cos^{2} u}$

$= \frac{\cos^{2} u \frac{d u}{d x} + \sin^{2} u \frac{d u}{d x}}{\cos^{2} u} = \frac{d u}{\cos^{2} u}$

$= \sec^{2} u \frac{d u}{d x}$

Proof for $\frac{d}{d x} \sec u$

$\frac{d}{d x} \tan u = \frac{\cos u \frac{d}{d x} \sin u - \sin u \frac{d}{d x} \cos u}{\cos^{2} u}$

$= \frac{\cos^{2} \frac{d u}{d x} + \sin^{2} u \frac{d u}{d x}}{\cos^{2} u} = \frac{\frac{d u}{d x}}{\cos^{2} u}$

$= \sec^{2} u \frac{d u}{d x}$

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