Let `f(x)=(1+b^(2))x^(2)+2bx+1` and let m(b) be the minimum value of f (x). As b varies, the range of m (b) is

If f(x) = frac {x^2 -1}{x^2 +1} , for every real x, then the minimum value of f(x) is.

If minimum value of f(x)=(x^(2)+2bx+2c^(2)) is greater than the maximum value of g(x)=-x^(2)-2cx+b^(2) , then (x in R)

Let cos(2 tan^(-1) x)=1/2 then the value of x is

If f(x)=x^3+b x^2+c x+d and 0 < b^2 < c , then f(x) is

Let P be a variable point on the elipse (x^(2))/(a ^(2)) +(y ^(2))/(b ^(2)) =1 with foci F_(1) and F_(2). If A is the area of the triangle PF _(1) F_(2), then maximum value of A is

Let f(x)=int x^2/((1+x^2)(1+sqrt(1+x^2)))dx and f(0)=0 then f(1) is