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13 March, 01:18

If sin (2x) = cos (x + 30°), what is the value of x?

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  1. 13 March, 01:41
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    x = - 10 ° + π/6 + (2 π n_1) / 3 for n_1 element Z

    or x = 30 ° + π/2 + 2 π n_2 for n_2 element Z

    Step-by-step explanation:

    Solve for x:

    sin (2 x) = cos (x + 30 °)

    Rewrite the right hand side using cos (θ) = sin (θ + π/2):

    sin (2 x) = sin (30 ° + π/2 + x)

    Take the inverse sine of both sides:

    2 x = - 30 ° + π/2 - x + 2 π n_1 for n_1 element Z

    or 2 x = 30 ° + π/2 + x + 2 π n_2 for n_2 element Z

    Add x to both sides:

    3 x = - 30 ° + π/2 + 2 π n_1 for n_1 element Z

    or 2 x = 30 ° + π/2 + x + 2 π n_2 for n_2 element Z

    Divide both sides by 3:

    x = - 10 ° + π/6 + (2 π n_1) / 3 for n_1 element Z

    or 2 x = 30 ° + π/2 + x + 2 π n_2 for n_2 element Z

    Subtract x from both sides:

    Answer: x = - 10 ° + π/6 + (2 π n_1) / 3 for n_1 element Z

    or x = 30 ° + π/2 + 2 π n_2 for n_2 element Z
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