Use a graph of sin 2 θ and the text discussion just before (12.4) to verify the equations (12.4). Note that the area under the sin 2 θ graph from 0 to π / 2 and the area from π /2 to π are mirror images of each other, and this will be true also for any function of sin 2 θ .
Use a graph of sin 2 θ and the text discussion just before (12.4) to verify the equations (12.4). Note that the area under the sin 2 θ graph from 0 to π / 2 and the area from π /2 to π are mirror images of each other, and this will be true also for any function of sin 2 θ .
Use a graph of
sin
2
θ
and the text discussion just before (12.4) to verify the equations (12.4). Note that the area under the
sin
2
θ
graph from 0 to
π
/
2
and the area from
π
/2 to
π
are mirror images of each other, and this will be true also for any function of
sin
2
θ
.
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Fundamental Trigonometric Identities: Reciprocal, Quotient, and Pythagorean Identities; Author: Mathispower4u;https://www.youtube.com/watch?v=OmJ5fxyXrfg;License: Standard YouTube License, CC-BY