Find the number of roots of the equation `16 sec^(3) theta - 12 tan^(2) theta - 4 sec theta =9` in interval `(-pi,pi)`

The number of solution of the equation 5 sec theta -13=12 tan theta in [0,2pi] is

x = a sec theta, y = b tan theta .

( 1 + tan theta + sec theta ) ( 1 + cot theta - cosec theta ) =

The number of solutions of the paires of equations : 2sin^(2)theta - cos2theta = 0 , 2cos^(2)theta - 3sintheta = 0 in the interval [0,2pi] is :

Prove that cosec^(2) theta + sec^(2) theta = cosec^(2) theta sec^(2) theta .

Show that tan ^(2) theta +tan ^(4) theta =sec ^(4) theta -sec ^(2) theta

Find the number of solution for , sin 5 theta * cos 3 theta = sin 9 theta * cos 7 theta in [0,(pi)/2]

Let p,qin N and q gt p , the number of solutions of the equation q|sin theta |=p|cos theta| in the interval [0,2pi] is

If sec^(2) theta(1+sin theta) (1-sin theta)=k , find the value of k.

Prove that (1+cot theta - cosec theta)(1+tan theta + sec theta) =2 .