Angle Sum and Difference Identities

Presentation

•

Mathematics

•

11th - 12th Grade

•

Hard

Joseph Anderson

FREE Resource

6 Slides • 7 Questions

Sum and Difference Identities

Objectives

We will be able to expand a trig expression by applying the sum or difference identity of that trig function.
We will be able to condense the expanded form of the sum or difference identity.
We will be able to evaluate the sin, cos, or tan of unfamiliar angles using the sum of difference of familiar angles.

Multiple Choice

Evaluate $\cos60\degree$

$\frac{1}{2}$

$\frac{\sqrt{3}}{2}$

$\frac{\sqrt{2}}{2}$

Multiple Choice

Evaluate $\sin360\degree$

$\frac{\sqrt{3}}{2}$

$\frac{\sqrt{2}}{2}$

$\frac{1}{2}$

Sum and Difference Identities

Sine

Sum and Difference Identities

Cosine

Multiple Choice

Which of the following is the same as $\cos\ \left(A+B\right)$

$\sin A\cos\ B\ +\ \cos\ A\ \sin\ B$

$\sin\ A\ \cos\ B\ -\ \cos\ A\ \sin\ B$

$\cos\ A\ \cos\ B\ +\ \sin\ A\ \sin\ B$

$\cos\ A\ \cos\ B\ -\ \sin\ A\ \sin\ B$

Sum and Difference Identities

Tangent

Multiple Choice

Which of the following is equivalent to $\tan\ \left(A-B\right)$

$\tan\ A\ -\ \tan\ B$

$\frac{\tan\ A\ -\tan\ B}{1+\ \tan A\tan B}$

$\frac{\tan\ A\ +\tan\ B}{1-\ \tan A\tan B}$

$\frac{\sin\ A}{\cos\ B}$

Examples

$\sin105\degree$
$\tan210\degree$
$\cos\left(\frac{\pi}{3}+\frac{\pi}{6}\right)$
$\sin\left(\frac{\pi}{2}-\frac{\pi}{6}\right)$
$\tan\left(15\degree\right)$

Multiple Choice

Expand $\cos\ \left(\frac{\pi}{5}+\frac{\pi}{6}\right)$

$\cos\frac{\pi}{5}\cos\frac{\pi}{6}-\sin\frac{\pi}{5}\sin\frac{\pi}{6}\$

$\cos\frac{\pi}{5}\cos\frac{\pi}{6}+\sin\frac{\pi}{5}\sin\frac{\pi}{6}\$

$\cos\ \frac{2\pi}{11}$

$\cos\frac{\pi}{5}\sin\frac{\pi}{6}-\cos\frac{\pi}{5}\sin\frac{\pi}{6}\$

Multiple Choice

$\cos75^o\cos15^o-\sin75^{o\ }\sin15^o$ is equivalent to

$\sin\ 90^{o\ }$

$\sin\ 60^{o\ }$

$\cos\ 90^{o\ }$

$\cos\ 60^{o\ }$

Poll

Gauge your understanding of today's lesson

confident

okay

need practice

confused

Sum and Difference Identities

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