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17 March, 15:35

Rewrite the product as a sum: 10cos (5x) sin (10x)

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  1. 17 March, 15:58
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    10cos (5x) sin (10x) = 5[sin (15x) + sin (5x) ]

    Step-by-step explanation:

    In this question, we are tasked with writing the product as a sum.

    To do this, we shall be using the sum to product formula below;

    cosαsinβ = 1/2[ sin (α + β) - sin (α - β) ]

    From the question, we can say α = 5x and β = 10x

    Plugging these values into the equation, we have

    10cos (5x) sin (10x) = (10) * 1/2[sin (5x + 10x) - sin (5x - 10x) ]

    = 5[sin (15x) - sin (-5x) ]

    We apply odd identity i. e sin (-x) = - sinx

    Thus applying same to sin (-5x)

    sin (-5x) = - sin (5x)

    Thus;

    5[sin (15x) - sin (-5x) ] = 5[sin (15x) - (-sin (5x)) ]

    = 5[sin (15x) + sin (5x) ]

    Hence, 10cos (5x) sin (10x) = 5[sin (15x) + sin (5x) ]
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