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

The smallest positive root of the equation tan x-x =0 lies in the interval

tan x gt x when x lies in

The least positive value of x satisfying (sin^(2) 2 x + 4 sin^(4) x - 4 sin^(2) x cos ^(2) x)/(4 - sin ^(2) 2 x - 4 sin^(2) x)= (1)/(9) is

There exists a positive real number x satisfying cos(tan^(-1)x)=x . Then the value of "cos"^(-1)((x^(2))/2) is

There exists a positive real number x satisfying cos(tan^(-1)x)=x . Then the value of cos^(-1)(x^(2)/2) is

The least positive integral value of x which satisfies the inequality ""^(10)C_(x-1)gt2.""^(10)C_(x) is

For x in R , 3 cos (4x-5) +4 lies in the interval

The smallest positive values of x and y which satisfy tan (x-y)=1, sec (x+y)=2//sqrt(3) are

The smallest positive value of x (in radians ) satisfying the equation log_(cos x) ((sqrt(3))/(2) sin x) = 2 + log _(sec x) tan x)

If f(x)= tan x - x then The least +ve value of 'x' for which f(x)=0 lies in the quadrant