Question

How do you find the value of `cot(theta/2)` given `tantheta=-7/24` and `(3pi)/2<theta<2pi`?

Answer 1

`cot(theta/2)=-7.`

Explanation:

We know that,
`tantheta=(2tan(theta/2))/{1-tan^2(theta/2)}`

So, letting `tan(theta/2)=t`, & using given value of `tantheta=-7/24` in the LHS, we get the eqn.,

`-7/24=(2t)/(1-t^2),` or,`-7+7t^2=48t,` i.e., `7t^2-48t-7=0.`
`:.(t-7)(7t+1)=0,.` which gives `t=tan(theta/2)=7, or, -1/7.`

Clearly, `cot(theta/2)=1/7, or, -7.`

Given that `3pi/2`<`theta`<`2pi.` `rArr` `3pi/4`<`(theta/2)`<`pi,` meaning, `theta/2` lies in the IInd Quadrant, where cot is `-ve.`

Finally, `cot(theta/2)!=1/7, but, =-7.`