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29 July, 20:36

Verify the identity cosx cos (-x) - sinx sin (-x) = 1

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  1. 29 July, 21:04
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    (identity has been verified)

    Step-by-step explanation:

    Verify the following identity:

    cos (x) cos (-x) - sin (x) sin (-x) = 1

    Hint: | Cosine is an even function.

    Use the identity cos (-x) = cos (x):

    cos (x) cos (x) - sin (-x) sin (x) = ^?1

    Hint: | Sine is an odd function.

    Use the identity sin (-x) = - sin (x):

    cos (x) cos (x) - - sin (x) sin (x) = ^?1

    Hint: | Evaluate cos (x) cos (x).

    cos (x) cos (x) = cos (x) ^2:

    cos (x) ^2 - ( - sin (x) sin (x)) = ^?1

    Hint: | Evaluate - (-sin (x)) sin (x).

    - (-sin (x)) sin (x) = sin (x) ^2:

    cos (x) ^2 + sin (x) ^2 = ^?1

    Hint: | Use the Pythagorean identity on cos (x) ^2 + sin (x) ^2.

    Substitute cos (x) ^2 + sin (x) ^2 = 1:

    1 = ^?1

    Hint: | Come to a conclusion.

    The left hand side and right hand side are identical:

    Answer: (identity has been verified)
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