Use the sum-to-product identities to rewrite the following expression as a product.sin(x)

asked Feb 1, 2023 47.1k views

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Use the sum-to-product identities to rewrite the following expression as a product.sin(x) – sin(5x)

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Using the sum-to-product identity:

$\sin A-\sin B=2\cos ((A+B)/(2))\sin ((A-B)/(2))$

we can replace our expression and solve, where A = x and B = 5x:

$\sin (x)-\sin (5x)=2\cos ((x+5x)/(2))\sin ((x-5x)/(2))$

Simplifying:

$\sin (x)-\sin (5x)=2\cos ((6x)/(2))\sin ((-4x)/(2))$
$\sin (x)-\sin (5x)=2\cos (3x)\sin (-2x)$

Answer:

$=2\cos (3x)\sin (-2x)$

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