Sine-squared function

Definition

This function, denoted ${\displaystyle \sin ^{2}}$, is defined as the composite of the square function and the sine function. Explicitly, it is the map:

${\displaystyle x\mapsto (\sin x)^{2}}$

For brevity, we write ${\displaystyle (\sin x)^{2}}$ as ${\displaystyle \sin ^{2}x}$.

Key data

Item	Value
Default domain	all real numbers, i.e., all of ${\displaystyle \mathbb {R} }$
range	${\displaystyle [0,1]}$, i.e., ${\displaystyle \{y\mid 0\leq y\leq 1\}}$ absolute maximum value: 1, absolute minimum value: 0
period	${\displaystyle \pi }$, i.e., ${\displaystyle 180\,^{\circ }}$
local maximum value and points of attainment	All local maximum values are equal to 1, and are attained at odd integer multiples of ${\displaystyle \pi /2}$.
local minimum value and points of attainment	All local minimum values are equal to 0, and are attained at integer multiples of ${\displaystyle \pi }$.
points of inflection (both coordinates)	odd multiples of ${\displaystyle \pi /4}$, with value 1/2 at each point.
derivative	${\displaystyle x\mapsto \sin(2x)=2\sin x\cos x}$, i.e., double-angle sine function.
second derivative	${\displaystyle x\mapsto -2\cos(2x)}$
${\displaystyle n^{th}}$ derivative	${\displaystyle 2^{n-1}}$ times an expression that is ${\displaystyle \pm \sin }$ or ${\displaystyle \pm \cos }$ of ${\displaystyle 2x}$, depending on the remainder of ${\displaystyle n}$ mod ${\displaystyle 4}$
antiderivative	${\displaystyle x\mapsto {\frac {x}{2}}-{\frac {\sin(2x)}{4}}+C}$
mean value over a period	1/2
expression as a sinusoidal function plus a constant function	${\displaystyle (1/2)-\cos(2x)/2}$