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30 July, 21:34

Prove 8cos^4 (θ) = 3 + 4cos (2θ) + cos (4θ)

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  1. 30 July, 21:57
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    See below.

    Step-by-step explanation:

    We make use of the double angle formula:

    cos 2θ = 2 cos^2θ - 1.

    8cos^4 (θ) = 3 + 4cos (2θ) + cos (4θ)

    8cos^4 (θ) = 3 + 4 (2cos^2θ - 1) + cos (4θ)

    8cos^4 (θ) = 3 + 8cos^2θ - 4 + cos (4θ)

    8cos^4 (θ) = 8cos^2 θ - 1 + cos (4θ)

    8cos^4 (θ) = 8cos^2 θ - 1 + 2cos^2 2θ - 1

    8cos^4 (θ) = 2 (4cos^2 θ + cos^2 2θ - 1)

    4cos^4 (θ) = 4cos^2 θ + cos^2 2θ - 1

    4cos^4 (θ) = 4cos^2 θ + (2 cos^2 θ - 1) ^2 - 1

    4cos^4 (θ) = 4cos^2 θ + 4cos^4 θ - 4cos^2θ + 1 - 1

    4 cos^4 θ = 4 cos^4 θ.

    - Verified.

    Phew! That was a long one.
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