Sine-squared function: Difference between revisions

Revision as of 10:43, 26 August 2011

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

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

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

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

@@ Line 14: / Line 14: @@
 | Default [[domain]] || all real numbers, i.e., all of <math>\R</math>
 |-
-| [[range]] || <math>[0,1]</math>, i.e., <math>\{ y \mid 0 \le y \le 1 \}</math>
+| [[range]] || <math>[0,1]</math>, i.e., <math>\{ y \mid 0 \le y \le 1 \}</math><br>[[absolute maximum value]]: 1, [[absolute minimum value]]: 0
 |-
 | [[period]] || <math>\pi</math>, i.e., <math>180\,^\circ</math>