Ask Question
5 February, 05:42

Find all solutions to the equation in the interval [0, 2π). cos 4x - cos 2x = 0

+3
Answers (1)
  1. 5 February, 07:50
    0
    See below in bold.

    Step-by-step explanation:

    cos 4x = 2cos^2 2x - 1 = 2 (2 cos^2 x - 1) ^2 - 1

    and cos 2x = 2 cos^2 x - 1 so we have:

    2 (2 cos^2 x - 1) ^2 - 1 - (2cos^2 x - 1) = 0

    2 (2 cos^2 x - 1) ^2 - 2 cos^2 x = 0

    (2 cos^2 x - 1) ^2 - cos^2 x = 0

    Let c = cos^2 x, then:

    (2c - 1) ^2 - c = 0

    4c^2 - 4c + 1 - c = 0

    4c^2 - 5c + 1 = 0

    c = 0.25, 1

    cos^2 x = 0.25 gives cos x = + / - 0.5

    and cos^2 x = 1 gives cos x = + / - 1.

    So for x = + / - 1, x = 0, π.

    For cos x = + / - 0.5, x = π/3, 2π/3, 4π3,5π/3.
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “Find all solutions to the equation in the interval [0, 2π). cos 4x - cos 2x = 0 ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers