Question

How do you solve for 0 ≤ x < 2π using the equation 4sin ² x - 1 = 0 ?

Answer 1

`pi/6,(5pi)/6,(7pi)/6,(11pi)/6`

Explanation:

`4sin^2x-1=0rArrsin^2x=1/4rArrsinx=color(red)(+-1/2)`
Given,`0<=x<2pi`

• `0<=x<(pi/2)rArrsinx=1/2=sin(pi/6)rArrx=color(red)(pi/6)`
• `(pi/2) <= x<(pi)rArrsinx=1/2=sin(pi-pi/6)=sin((5pi)/6)rArrx=color(red)((5pi)/6)`
• `pi<=x<(3pi)/2rArrsinx=-1/2=sin(pi+pi/6)=sin((7pi)/6)rArrx=color(red)((7pi)/6)`
• `(3pi)/2<=x<2pirArrsinx=-1/2=sin(2pi-pi/6)=sin((11pi)/6)rArrx=color(red)((11pi)/6)`
  Note:The general solution is
  `sinx=+-1/2rArrsinx=sin(+-pi/6)`
  So,
  `x=kpi+(-1)^k(+-pi/6),kinZ`
  Taking `k=0,+-1,+-2,...`we can obtain above answer.