Prove that the least positive value of `x ,` satisfying `tanx=x+1,` lies in the interval `(pi/4,pi/2)`

Prove that the least positive value of x , satisfying tanx=x+1,lies in the in terval(pi/4,pi/2)dot

Prove that the least positive value of x , satisfying tanx=x+1,lies in the in terval(pi/4,pi/2)dot

Prove that the least positive value of x satisfying tan x=x+1, lies in the interval ((pi)/(4),(pi)/(2))

Prove that the least positive value of x, satisfying tan x=x+1, lies in the interval ((pi)/(4),(pi)/(2))

The least positive value of x, satisfying tan x = x + 1, lies in the interval is

Prove that the least positive value of x , satisfying tanx=x+1,l i e sint h ein t e r v a l(pi/4,pi/2)dot

The value of sin sqrt(x^(2) - pi^(2)/36) lies in the interval

Find the smallest positive value of x and y satisfying x-y=pi/4 and cotx+coty=2

If the set of values of x satisfying the inequalitytan x.tan3x<-1 in the interval (0,(pi)/(2)) is (a,b) then the value of ((36(b-a))/(pi)) is