Derivative Rules

Basic Rules

Rule	Formula	Example
Constant Rule	d/dx [c] = 0	d/dx [5] = 0
Power Rule	d/dx [xⁿ] = n·xⁿ⁻¹	d/dx [x³] = 3x²
Constant Multiple Rule	d/dx [c·f] = c·f'	d/dx [5x²] = 10x
Sum/Difference Rule	d/dx [f ± g] = f' ± g'	d/dx [x² + x] = 2x + 1
Product Rule	d/dx [f·g] = f'·g + f·g'	d/dx [x·sin(x)] = sin(x) + x·cos(x)
Quotient Rule	d/dx [f/g] = (f'g - fg') / g²	d/dx [x/eˣ] = (eˣ - xeˣ) / e²ˣ
Chain Rule	d/dx [f(g(x))] = f'(g(x))·g'(x)	d/dx [sin(x²)] = cos(x²)·2x

Common Function Derivatives

f(x)	f'(x)
xⁿ	n·xⁿ⁻¹
eˣ	eˣ
aˣ	aˣ · ln(a)
ln(x)	1/x
log_a(x)	1 / (x · ln(a))
sin(x)	cos(x)
cos(x)	-sin(x)
tan(x)	sec²(x)
cot(x)	-csc²(x)
sec(x)	sec(x)·tan(x)
csc(x)	-csc(x)·cot(x)
arcsin(x)	1 / √(1 - x²)
arccos(x)	-1 / √(1 - x²)
arctan(x)	1 / (1 + x²)
\|x\|	x / \|x\|, x ≠ 0