`(x)/(x^(2)-5x+9)le1.`

Prove the following: 2tan^(-1)x=sin^(-1)((2x)/(1+x^(2))),+x+le1

Solve 1le(3x^(2)-7x+8)/(x^(2)+1)le2 .

Find the value of x graphically which satisfy |(x^(2))/(x-1)|le1.

The solution set of the inequation (x)/(x+2) le (1)/(x)

If f(x) = {(x-5,x le1),(4x^(2)-9, 1ltxlt2),(3x+4, x ge2):} then f^(')(2^(+)) =

The equation 2 "cos"^(2)((x)/(2))"sin"^(2) x = x^(2) + (1)/(x^(2)), 0 le x le (pi)/(2) has no real solution more than one solution none of these

The relation f is defined by f(x)={{:(,x^(2), 0 le x le 3),(,3x,3 le x le 10):} The relation g is defined by g(x)={{:(,x^(2),0 le x le 2),(,3x,2 le x le 10):} Show that f is a function and g is not a function.

f(x) = (2x^(2) + 3)/(5) , for oo lt x le 1 = 6 -5x , for 1 lt x lt 3 = x-3 , for 3 le x lt 8 , then

If f(x) ={((sqrt(1+kx)- sqrt(1-kx))/x, -1 le x le0),(2x^(2)+3x-2, 0 lex le1):} is continuous at x = 0, thenk =

If the function f(x) ={(ax-b, x le1),(3x, 1lt x lt 2),(bx^(2)-a, x ge 2):} is continuous at x =1 and discontinuous at x =2, then