Let `f(x)=ax^(2)+bx+c,ab,c in R.` It is given `|f(x)|le1,|x|le1`
The possible value of `|a+c|,if(8)/(3)a^(2)+2ab^(2)` is maximum is given by

Let f(x) = ax^2 + bx +C,a,b,c in R .It is given |f(x)|<=1,|x|<=1 The possible value of |a + c| ,if 8/3a^2+2b^2 is maximum, is given by

Let f(x) = a x^2 + bx + c , where a, b, c in R, a!=0 . Suppose |f(x)| leq1, x in [0,1] , then

If f(x) = ax^(2) + bx + c is such that |f(0)| le 1, |f(1)| le 1 and |f(-1)| le 1 , prove that |f(x)| le 5//4, AA x in [-1, 1]

f(x)=abs(x-1)+abs(x-2)+abs(x-3) . Find the range of f(x).

Let f(x)=min{1,cos x,1-sinx}, -pi le x le pi , Then, f(x) is

if f(x) = {{:(x^2, x le 1),(ax + b ,x gt 1):} is differentiable at x = 1 . Find the values of a and b.

Given 0 le x le 1/2 , then the value of : tan[sin^-1(x/sqrt2 + (sqrt(1-x^2))/sqrt2)- sin^-1x] is

Let f(x)=ab sin x+bsqrt(1-a^(2))cosx+c , where |a|lt1,bgt0 then a. maximum value of f(x) is b, if c = 0 b. difference of maximum and minimum value of f(x) is 2b c. f(x)=c, if x=-cos^(-1)a d. f(x)=c, if x=cos^(-1)a

Let f(x)=abs(x-1)+abs(x-2)+abs(x-3)+abs(x-4), then a. least value of f(x) is 4 b. least value is not attained at unique point c. the number of integral solution of f(x)=4 is 2 d. the value of (f(pi-1)+f(e))/(2f(12/5)) is 1

Let f(x)=(ax^2+bx+c)/(x^2+1) such that y=-2 is an asymptote of the curve y=f(x) . The curve y=f(x) is symmetric about Y-axis and its maximum values is 4. Let h(x)=f(x)-g(x) ,where f(x)=sin^4 pi x and g(x)=log_(e)x . Let x_(0),x_(1),x_(2)...x_(n+1) be the roots of f(x)=g(x) in increasing order Then, the absolute area enclosed by y=f(x) and y=g(x) is given by