How do you solve cos^2(3theta)-5cos(3theta)+4=0cos2(3θ)5cos(3θ)+4=0?

2 Answers
Douglas K.
Oct 23, 2016

Please see the explanation.

Explanation:

Please notice that the quadratic factors into:

(cos(3theta) - 1)(cos(3theta) - 4) = 0(cos(3θ)1)(cos(3θ)4)=0

Which implies

cos(3theta) = 1 and cos(3theta) = 4cos(3θ)=1andcos(3θ)=4

However, cos(3theta) = 4cos(3θ)=4 must be discarded, because it exceeds the range of the cosine function.

This leaves:

cos(3theta) = 1cos(3θ)=1

To make the cosine function disappear, take the inverse cosine of both sides:

3theta = cos^-1(1)3θ=cos1(1)

The inverse cosine of 1 is zero:

3theta = 03θ=0

But it repeats every integer multiple of 2pi2π from -oo to oo:

3theta = 0 + 2npi; n = ...,-3, -2, -1, 0, 1, 2, 3,...

Divide by 3:

theta = 2/3npi; n = ...,-3, -2, -1, 0, 1, 2, 3,...

Nghi N.
Oct 23, 2016

t = (2kpi)/3

Explanation:

Call 3t = T, and solve the quadratic equation for cos T:
cos^2 T - 5cos T + 4 = 0
D = d^2 = 25 - 16 = 9 --> d = +- 3
There are 2 real roots:
cos T = -b/(2a) +- d/(2a) = 5/2 +- 3/2
cos T1 = 4 (rejected as > 1)
cos T2 = (5 - 3)/2 = 1
cos T = cos 3t = 1
Trig unit circle -->

a/ 3t = 0 + 2kpi -->
t = (2kpi)/3
b/ 3t = 2pi + 2kpi-->
t = (2pi)/3 + (2kpi)/3
General answer: t = (2kpi)/3

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