1 Answer

DaveVentura · Answer 1 · 2020-03-14T14:53:32+0000

Answer:

False

sin x cos y
$\\eq(\bf 1)/(\bf 2)$ (sin (x + y) + cos (x - y))

Explanation:

Given
$\sin x \cos y = 1/2(\sin(x + y) + \cos(x - y))\hfill (1)$

To verify that the equality is true or false

$\sin (x+y)=\sin x \cos y+ \cos x \sin y$ and

$\cos (x-y)=\cos x \cos y+ \sin x \sin y$

Now adding the above equations we get

$\sin (x+y)+ \cos (x-y)= \sin x \cos y+ \cos x \sin y+ \cos x \cos y+ \sin x \sin y\hfill (2)$

Comparing the equations (1) and (2) we get

$\sin x \cos y \\eq \frac {1}{2} \(sin (x + y) + \cos (x - y))$

Therefore the given equality is not true (ie, false)

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