Question

Tan(2x)-cot(x)=0?

I solved it and got the solutions: pi/6, 5pi/6, 7pi/6 and 11pi/6. Why did I not get the pi/2 and 3pi/2 solutions?

Answer 1

My solution is found in explanation section.

Explanation:

`tan2x-cotx=0`

`tan2x=cotx`

`tan2x*tanx=1`

`(sin2x*sinx)/(cos2x*cosx)=1`

`[1/2*(cosx-cos3x)]/[1/2*(cos3+cosx)]=1`

`(cosx-cos3x)/(cos3x+cosx)=1`

`cosx-cos3x=cos3x+cosx`

`2cos3x=0`

`cos3x=0`

I have `2` states for `cos3x=0`,

`a)` `cos3x=cos(pi/2+2pi*k)`

`3x=pi/2+2pi*k`, so `x=pi/6+(2pi)/3*k`

Consequently, `x_1=pi/6`, `x_2=(5pi)/6` and `x_3=(3pi)/2` for `k=0, 1` and `2`

`b)` `cos3x=cos((3pi)/2+2pi*k)`

`3x=(3pi)/2+2pi*k`, so `x=pi/2+(2pi)/3*k`

Consequently, `x_4=pi/2`, `x_5=(7pi)/6` and `x_6=(11pi)/6` for `k=0, 1` and `2`