Question

Determine all values of θ between 0 and 4π for which sin θ =√3 over 2 ?

Answer 1

The values of `theta` are `pi/3,(2pi)/3,(7pi)/3,(8pi)/3`.

Explanation:

We must use following properties:

`color(red)(sin x = sin(2npi+x))`
`color(red)(sin x = sin((2n-1)pi-x))`

Where `n` is an integer.
Since `sqrt3/2 >0`, `theta` has to be in the first and second quadrant `(0<=theta<=pi` and `2pi<=theta<=3pi)`.

We know `sin (color(red)(pi/3))= sqrt3/2` so using the first identity we get:

`sin (pi/3) = sin (2pi+pi/3)`
`sin (pi/3) = sin (color(red)((7pi)/3))`

And using the second:

`sin (pi/3)= sin(pi-pi/3)`
`sin (pi/3)=sin (color(red)((2pi)/3))`

First one again:

`sin ((2pi)/3)=sin(2pi+(2pi)/3)`
`sin ((2pi)/3)=sin (color(red)((8pi)/3))`

We can only use `n=1` because if it would to be bigger, `theta > 4pi`, which is not what we need.

All the values in red are the solutions to the equality

`sin theta = sqrt3/2` ,

so `theta -> {color(red)(pi/3),color(red)((2pi)/3),color(red)((7pi)/3),color(red)((8pi)/3)}`.

Answer 2

`theta=pi/3,(2pi)/3,(7pi)/3,(8pi)/3.`

Explanation:

`sintheta=root()(3)/2rArrcolor(red)(theta=kpi+(-1)^k(pi/3),kinZ)`
We have, `thetain[0,4pi]`
Taking `k=0,+-1,+-2,+-3...`
`k=0rArrtheta=pi/3in[0,4pi]`
`k=1rArrtheta=pi-pi/3=(2pi)/3in[0.4pi]`
`k=2rArrtheta=2pi+pi/3=(7pi)/3in[0,4pi]`
`k=3rArrtheta=3pi-pi/3=(8pi}/3in[0,4pi]`
`k=4rArrtheta=4pi+pi/3=(13pi)/3!in[0,4pi]`
`k=5rArrtheta=5pi-pi/3=4pi+(pi-pi/3)=4pi+(2pi)/3>4pi`
Also,`k=-1rArrtheta=-pi-pi/3=-(4pi)/3<0`
Hence, `theta=pi/3,(2pi)/3,(7pi)/3,(8pi)/3.`