If `tan theta = (1)/(2)` and `tan phi = (1)/(3)`, then the value of `theta + phi` is

Given both theta and phi are acute angles and sin theta = (1)/(2), cos phi = (1)/(3) , then the value of theta + phi belongs to

If tan theta = 3//4 , then the value of tan 2 theta + sec 2 theta is

If 2sec2theta = tan phi + cot phi , then one of the values of theta + phi is:

IF tan^2 theta=2 tan^2 phi +1 then find the value of cos 2 theta+sin^2 phi .

If tan theta = n tan phi then the maximum value of tan^(2)(theta-phi) is equal to

If tantheta = ntan phi then the maximum value of tan^(2)(theta - phi) is equal to

{:(" Column- I "," Column-II "),("A) If " ((sin theta)/(sin phi))^(2) = (tan theta)/(tan phi)=3 "then the value of " theta and phi " are ","(p) Infinite number of solutions "),("B) The number of solutions of " (sin ^(2) x + cos ^(4) x)/(cos^(2) x + sin^(4) x ) = 1 ,"q) " theta = n pi pm (pi)/(3)"," phi = n pi pm (pi)/(6) ),("(c) Solution of " cot 2 theta = cot ^(2) theta - tan ^(2) theta ,"r) " n pi pm (pi)/(4)):}

If tan theta = p - (1)/(4p) then sec theta - tan theta =

If tan theta = 5 a - (1)/(20a) then sec theta + tan theta =