If `sec theta = (5)/(3) and 0 lt theta lt (pi)/(2)`. Find all the other T-ratios.

If sec x cos 5x=-1 and 0 lt x lt (pi)/(4) , then x is equal to

sintheta = (3)/5 , (pi)/2 lt theta lt pi sin2theta = (-12)/25

Find an angle theta , where 0 lt theta lt (pi)/(2) which increases twice as fast as its sine.

Consider the equation sectheta+ cottheta = 31/12 On the basis of above, answer the following If 0 lt theta lt (pi)/(2) , then minimum value of [tan theta] is equal to (where [ ] is G.I.F)

If 0 lt theta lt (pi)/2 and 5 tan theta = 4 then (5 sin theta - 3 cos theta) / (sintheta +2 cos theta ) = 5/14

If the equation x^2 +4x sintheta + tantheta=0\ (0 < theta < pi/2) has repeated roots, then theta equals (i) pi/12 (ii) pi/6 (iii) pi/12 or (5pi)/12 (iv) pi/6 or pi/12

Given sintheta=(3)/(5) . Find all the other T-rations, if theta lies in the first quadrant.

Given sintheta=(3)/(5) . Find all the other T-rations, if theta lies in the first quadrant.

If sec theta=13/12 , find sin theta and cot theta .