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10 June, 03:47

Solutions in the interval for sin^2x-cos^2x=0

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Answers (2)
  1. 10 June, 04:07
    0
    cos^2 x - sin^2 x = 0

    cos 2x = 0

    x = 45 and 135

    Add or subtract multiples of 360. Those are valid x values also.
  2. 10 June, 04:08
    0
    Sin²x - cos²x=0

    Remember:

    sin²x + cos²x = 1 ⇒ sin²x=1-cos²x

    Therefore:

    sin²x - cos²x=0

    (1-cos²x) - cos²x=0

    -2cos²x=-1

    cos² x=-1 / (-2)

    cos²x=1/2

    cos x=⁺₋√ (1/2)

    cos x=⁺₋ (√2) / 2

    We have two solutions:

    Solution 1:

    x=cos⁻¹ - (√2) / 2=3π/4 + Kπ or 135º + 180ºk

    Solution 2:

    x=cos⁻¹ (√2) / 2=π/4 + Kπ or 45º+180ºk (k = ... - 2,-1,0,1,2 ...)

    Solution=solution 1 U solution 2=π/4+π/2 K or 45º+90ºK

    Answer: π/4+π/2 K or 45º+90ºK
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