If tan ax + cot ax and |tan x| + |cot x| are periodic functions of the same fundamental then a equals

Draw the graph of f(x) = |tan x| + |cot x|.

If f(x)=tan^2((pix)/(n^2-5n+8))+cot(n+m)pix;(n in N, m in Q) is a periodic function with 2 as its fundamental period, then m can't belong to

If tan x + cot x =2 , then sin^(2n)x + cos^(2n) x is equal to

Solve the equation cot x + tan x = 2 cosec x .

Solve the equation : tan x + cot x =2

If tan alpha and tan beta are two solutions of x^(2)-px +q = 0, cot alpha and cot beta are the roots of x^(2)- rx +s = 0 then the value of rs is equal to

int (dx)/(tan x+ cot x+ sec x+ cosec x)

Solve 2 cot 2x -3 cot 3x = tan 2x .

If tan A + cot A = 5, find the value of tan^2 A + cot^2 A .

Solve the equation tan 2x = -cot (x+pi/6) .