How do you solve #cos2x+5=4sinx# for #0<=x<=360#?

1 Answer
Nghi N.
Oct 25, 2016

#pi/2#

Explanation:

cos 2x + 5 = 4sin x
Use trig identity: #cos 2x = 1 - 2sin^2 x#
#1 - 2sin^2 x + 5 = 4sin x#
Bring the equation to standard form:
#2sin^2 x + 4sin x - 6 = 0#
Solve this quadratic equation for sin x.
Since a + b + c = 0, use shortcut. There are 2 real roots:
sin x = 1, and
#sin x = c/a = -6/2 = - 3# (rejected as < -1)
Unit circle gives -->
sin x = 1 --> #x = pi/2#
Answers for #(0, 2pi)#:
#pi/2#
Check.
#x = pi/2# --> sin x = 1 --> #cos 2x = cos pi = - 1 #
cos 2x + 5 = 4sin x --> - 1 + 5 = 4. OK

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