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17 May, 12:44

Solve 2sin²x+cosx-2=0 for o≤x≤360

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  1. 17 May, 13:52
    0
    2 (Sinx) ^2 + Cosx - 2 = 0.

    Recall (Sinx) ^2 + (Cosx) ^2 = 1.

    Therefore (Sinx) ^2 = 1 - (Cosx) ^2

    Substitute this into the question above.

    2 (Sinx) ^2 + Cosx - 2 = 0.

    2 (1 - (Cosx) ^2) + Cosx - 2 = 0 Expand

    2 - 2 (Cosx) ^2 + Cosx - 2 = 0

    2 - 2 - 2 (Cosx) ^2 + Cosx = 0

    - 2 (Cosx) ^2 + Cosx = 0 Multiply both sides by - 1.

    2 (Cosx) ^2 - Cosx = 0

    Let p = Cosx

    2p^2 - p = 0 Factorise

    p (2p - 1) = 0. Therefore p=0 or (p-1) = 0

    p=0 or (p-1) = 0

    p=0 or p = 0 + 1.

    p=0 or p = 1 Recall p = Cosx

    Therefore Cosx = 0 or 1.

    For 0
    Cosx = 0, x = Cos inverse (0), x = 90, 270

    Cosx = 1, x = Cos inverse (1), x = 0, 360

    Therefore x = 0,90, 270 & 360 degrees.

    Cheers.
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