(i) Prove that general solution of `sintheta=0` is given by `theta=npi; n in Z` (ii) Prove that general solution of `costheta=0` is `theta=((2n+1)pi/2); n in Z`

(i) Prove that general solution of sin theta=0 is given by theta=n pi;!=psi lonZ( ii) Prove that general solution of cos theta=0 is theta=((2n+1)(pi)/(2));!=psi lon Z

(iii)Prove that general solution of tan theta=0 is theta=npi; n in Z (iv)Prove that the general solution of cot theta=0 is theta=(2n+1)pi/2, n in Z

Prove that the general solution of tan theta=tan alpha is given by : theta=n pi+alpha,n in Z

Prove that general solution of tan theta=tan alpha is given by theta=n pi+alpha;!=psi lon Z

Prove that the general solution of tan"theta"=tan"alpha" is given by : theta=npi+alpha,n in Zdot

Prove that the general solution of sin theta=sin alpha is given by : theta=n pi+(-1)^(n)alpha,n in Z

General solution of tan theta=0 is theta= ......... where n in Z

Prove that the general solution of sin θ= sin α, is given by : theta=npi+(-1)^nalpha,n in Zdot

A general solution of tan^(2) theta+ cos 2 theta=1 is (n in Z)

A general solution of tan^(2) theta+ cos 2 theta=1 is (n in Z)