Find all solutions to the equation cosxcos(3x)-sinxsin(3x)=0 on the interval [0,2pi]

asked Jul 10, 2023 228k views

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We can condense the left side as

$\cos(x) \cos(3x) - \sin(x) \sin(3x) = \cos(x + 3x) = \cos(4x)$

Then the equation reduces to

$\cos(4x) = 0$

$4x = \pm \cos^(-1)(0) + 2n\pi$

$4x = \pm \frac\pi2 + 2n\pi$

$x = \pm \frac\pi8 + \frac{n\pi}2$

where
is any integer.

In the interval
$[0,2\pi]$ , we get the solutions

$x \in \left\{\frac\pi8, \frac{3\pi}8, \frac{5\pi}8, \frac{7\pi}8, \frac{9\pi}8, \frac{11\pi}8, \frac{13\pi}8, \frac{15\pi}8\right\}$

Archit Baweja answered Jul 17, 2023

3.1k points

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