Ask Question
16 May, 19:15

Find all solutions in the interval [0,2pi).

cos 2x + sqrt (2) sinx=1

+4
Answers (1)
  1. 16 May, 20:34
    0
    cos 2x + sqrt (2) sinx=1

    Note that: cos 2x = cos^2x - sin^2x = (1-sin^2x) - sin^2x = 1 - 2sin^2x.

    So, when alternatively written, you have the following equation:

    - 2sin^2x + sqrt (2) sinx + 1 = 1

    - 2sin^2x + sqrt (2) sinx = 0

    Then, let z=sin (x). So you get,

    - 2z^2 + sqrt (2) z = 0

    z ( - 2z + sqrt (2)) = 0

    Either z=0, or - 2z + sqrt (2) = 0 - - - > z=sqrt (2) / 2.

    Then, since z=0 or z=sqrt (2) / 2, therefore sin (x) = 0, or sin (x) = sqrt (2) / 2.

    Then, for you remains just to list the angles. (Let me know if this is not fair or if you got questions.)
Know the Answer?
Not Sure About the Answer?
Get an answer to your question ✅ “Find all solutions in the interval [0,2pi). cos 2x + sqrt (2) sinx=1 ...” in 📙 Mathematics if there is no answer or all answers are wrong, use a search bar and try to find the answer among similar questions.
Search for Other Answers