Let `f:(1,2)vecR` satisfies the inequality `(cos(2x-4)-33)/2

Iff:(1,2)->R satisfies the inequality (cos(2x-4)-33)/2 lt f(x) lt (x^2|4x-8|) (x-2)="" is

The minimum value of x which satisfies the inequality (sin^(-1)x)^(2)ge(cos^(-1)x)^(2) is

The number of integers satisfying the inequality cos^(-1)(cos((x^(2)+3)/(x^(2)+1)))+tan(tan^(-1)((7-3x^(2))/(1+x^(2))))>=2

The solution set satisfying the inequality,(sqrt(21-4a-a^(2)))/(a+1)<=1

Let f(x)=x+3ln(x-2)&g(x)=x+5ln(x-1) then the set of x satisfying the inequality f'(x)

Find the greatest integer x satisfying the inequality (2x+1)/(3)-(3x-1)/(2)>1

All the pairs (x,y) that satisfy the inequality 2^(sqrt(sin^(2)x-2sin x+5))*(1)/(4^(sin^(2)y))<=1 also satisfy the equation :

Let a>2 be a constant.If there are just 18 positive integers satisfying the inequality (x-a)(x-2a)(x-a^(2))<0, then find the value of a.

let a>2,a in N be a constant.If there are just 18 positive integers satisfying the inequality (x-a)(x-2a)(x-a^(2))<0 then which of the option is correct

The smallest integral x satisfying the inequality (1-log_(4)x)/(1+log_(2)x)le (1)/(2)x is.