Question

How to find all solutions to the following equations in the interval 0 ≤ θ < 2π?

Find all solutions to the following equations in the interval 0 ≤ θ < 2π. Give the exact value of the solution(s) where possible. If not possible, round your answer to
4 decimal places.

tan θ − 2 cos θ sin θ = 0

Answer 1

`0, pi/4, (3pi)/4, pi, (5pi)/4, (7pi)/4, 2pi`

Explanation:

tan t - 2sin t.cos t = 0
`sin t/(cos t) - 2sin t.cos t = 0`
`sin t - 2sin t.cos^2 t = 0`
Condition `cos t != 0`
`sin t( 1 - 2cos^2 t) = 0`
Use trig identity: `1 - 2cos^2 t = - cos 2t`
`- sin t.cos 2t = 0`
Either factor should be zero.
a. `sin t = 0` --> `t = kpi`
`For (0, 2pi)` the answers are: `t = 0; t = pi`; and `t = 2pi`
b. `cos 2t = 0` --> Unit circle gives 2 solutions for 2t:
`2t = pi/2 + 2kpi`, and `2t = (3pi)/2 + 2kpi`
1. `2t = pi/2 + 2kpi`
`t = pi/4 + kpi`
For `(0, 2pi)`, the answers are:
`t = pi/4`, and `t = pi/4 + pi = (5pi)/4`
2. `2t = (3pi)/2 + 2kpi`
`t = (3pi)/4 + kpi`
For `(0, 2pi)`, the answers are:
`t = (3pi)/4`, and `t = (3pi)/4 + pi = (7pi)/4`