How do you solve cos^2 x-sin^2 x=sin x?

2 Answers
Nghi N.
May 21, 2016

(pi/6),(5pi)/6, (3pi)/2

Explanation:

Replace in the equation cos^2 x by (1 - sin^2 x) -->
1 - sin^2 x - sin^2 x - sin x = 0
-2sin^2 x - sin x + 1 = 0
Solve this quadratic equation in sin x.
Since a - b + c = 0, use shortcut. The 2 real roots are: sin x = -1 and sin x = -c/a = 1/2.
a. sin x = -1 --> x = 3pi/2
b. sin x = 1/2 --> 2 solution arcs -->
x = pi/6
x = pi - pi/6 = (5pi)/6
General answers:
x = pi/6 + 2kpi
x = (5pi/6) + 2kpi
x = (3pi)/2 + 2kpi
Checking these answers by calculator is advised.

P dilip_k
May 21, 2016

pi/6(4k+1),pi/2(4k-1)

Explanation:

Putting cos^2x-sin^2x=cos2x we have

cos^2x-sin^2x=sinx

=>cos2x=sinx
=>cos2x=cos(pi/2-x)

So 2x=2kpi+-(pi/2-x)

where k epsilon Z

when
2x=2kpi+(pi/2-x)
=>2x+x=2kpi+pi/2=pi/2(4k+1)
=>3x=pi/2(4k+1)
=>x=pi/6(4k+1)

Again when
2x=2kpi-(pi/2-x)
=>2x=2kpi-pi/2+x
=>x=2kpi-pi/2=pi/2(4k-1)

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