Derivatives of Trigonometric and Inverse Functions
Derivatives of Trigonometric and Inverse Functions
In calculus, memorizing the derivatives of standard functions is essential. This guide covers the derivatives of trigonometric functions, inverse trigonometric functions, and general exponential and logarithmic functions.
Derivatives of Trigonometric Functions
Here are the derivatives of the six basic trigonometric functions:
- dxdโ(sinx)=cosx
- dxdโ(cosx)=โsinx
- dxdโ(tanx)=sec2x
- dxdโ(cotx)=โcsc2x
- dxdโ(secx)=secxtanx
- dxdโ(cscx)=โcscxcotx
Derivatives of Inverse Trigonometric Functions
The inverse trigonometric functions (often written as arcsinx or sinโ1x) have specific derivative rules:
- dxdโ(arcsinx)=1โx2โ1โ
- dxdโ(arccosx)=โ1โx2โ1โ
- dxdโ(arctanx)=1+x21โ
(Note: arccot, arcsec, and arccsc follow similar patterns, but these three are the most commonly tested).
General Exponential and Logarithmic Functions
For exponential and logarithmic functions with bases other than e, we adjust the derivative by multiplying or dividing by the natural logarithm of the base (lna):
- Exponential Function: dxdโ(ax)=axlna
- Logarithmic Function: dxdโ(logaโx)=xlna1โ
Applying the Chain Rule
When the input is a function u(x) rather than just x, you must apply the Chain Rule: multiply the outside derivative by the derivative of the inside function, uโฒ(x).
Example 1: Find dxdโtan(3x)
The outer function is tan(u) and the inner function is u=3x. dxdโtan(3x)=sec2(3x)โ dxdโ(3x)=3sec2(3x)
Example 2: Find dxdโarcsin(2x)
The outer function is arcsin(u) and the inner function is u=2x. dxdโarcsin(2x)=1โ(2x)2โ1โโ dxdโ(2x)=1โ4x2โ2โ