Question

How do you find all solutions of the equation `sin(x+pi/4)-sin(x-pi/4)=1` in the interval `[0,2pi)`?

Answer 1

`"The Soln. Set.="{2kpi+-pi/4 | k in ZZ.}.`

The Solns. in `[0,2pi), are, therefore, pi/4, and, 7pi/4.`

Explanation:

`sin(x+pi/4)-sin(x-pi/4)=1.`

`rArr 2cos[1/2{(x+pi/4)+(x-pi/4)}]sin[1/2{(x+pi/4)-(x-pi/4)}]=1.`

`rArr 2cosxsin(pi/4)=1.`

`rArr2*1/sqrt2*cosx=1.`

`rArr cosx=1/sqrt2=cos(pi/4).`

Knowing that, `costheta=cosalpha rArr theta=2kpi+-alpha, k in ZZ,`

`"The Soln. Set.="{2kpi+-pi/4 | k in ZZ.}.`

In Particular, the Solns. in `[0,2pi), are, therefore, pi/4, and, 7pi/4.`