The largest integral value of x satisfying the inequality `(tan^(-1)(x))^(2)-4(tan^(-1)(x))+3gt0` is :

Solve the inequality (tan^(-1)x)^(2)-4tan^(-1)x+3>0 for x.

The value of x satisfying the equation tan^(-1)(2x)+tan^(-1)3x=(pi)/(4) is

The solution of the inequality (tan^(-1)x)^(2)-3tan^(-1)x+2>=0 is

Least integral value of x satisfying the inequation (x^(2)+1)<(x+2)^(2)<2x^(2)+4x-12 is

The values of x satisfying the inequality [tan^(-1)x]^(2)-[tan^(-1)x]-2<=0 is (1.] denotes G.I.F.)

Sum of integral value(s) of x satisfying the inequality (x^(2)-3x-10)/(x^(2)+x+1)le0 , is

Least integral value of x satisfying the inequation (x^(2)+1)lt(x+2)^(2)lt2xx^(2)+4x-12is

The largest integral value of x which satisfies the inequality (4x+19)/(x+5)<(4x-17)/(x-3), is 2 (b) 3(c)4 (d) 1

Sum of integral value(s) of x satisfying the inequality (x^(2)-3x-10)/(x^(2)+x+1)<0, is

The number of integral values of x satisfying the equation tan^(-1) (3x) + tan^(-1) (5x) = tan^(-1) (7x) + tan^(-1) (2x) is ____