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24 October, 20:08

Write as a single term: cos (2x) cos (x) + sin (2x) sin (x)

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  1. 24 October, 22:40
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    Answer: cos (x)

    Step-by-step explanation:

    We have

    sin (x + y) = sin (x) * cos (y) + cos (x) * sin (y) (1) and

    cos (x + y) = cos (x) * cos (y) - sin (x) * sin (y) (2)

    From eq. (1)

    if x = y

    sin (x + x) = sin (x) * cos (x) + cos (x) * sin (x) ⇒ sin (2x) = 2sin (x) cos (x)

    From eq. 2

    If x = y

    cos (x + x) = cos (x) * cos (x) - sin (x) * sin (x) ⇒ cos² (x) - sin² (x)

    cos (2x) = cos² (x) - sin² (x)

    Hence:The expression:

    cos (2x) cos (x) + sin (2x) sin (x) (3)

    Subtition of sin (2x) and cos (2x) in eq. 3

    [cos² (x) - sin² (x) ]*cos (x) + [ (2sen (x) cos (x) ]*sin (x)

    and operating

    cos³ (x) - sin² (x) cos (x) + 2sin² (x) cos (x) = cos³ (x) + sin² (x) cos (x)

    cos (x) [ cos² (x) + sin² (x) ] = cos (x)

    since cos² (x) + sin² (x) = 1
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