Let `f (x) =x ^(2) + bx + c AA in R, (b,c, in R) ` attains its least value at `x =-` and the graph of `f (x)` cuts y-axis at `y =2.`
The least valur of `f 9x) AA x in ` R is :

Let f (x) =x ^(2) + bx + c AA in R, (b,c, in R) attains its least value at x =- and the graph of f (x) cuts y-axis at y =2. The value of f (-2) + f(0) + f(1)=

Let f(x)=x^(2)+bx+c AA x in R,(b,c in R) attains its least value at x=-1 and the graph of f(x) cuts y-axis at y=2

Let f (x) =x ^(2) + bx + c AA in R, (b,c, in R) attains its least value at x =-1 and the graph of f (x) cuts y-axis at y =2. If f (x) =a has two distinct real roots, then comlete set of values of a is :

Let |f (x)| le sin ^(2) x, AA x in R, then

Let f(x)={0AA x<0 and x^(2)AA x<=0 then AA x in R

Let f(x)=x^2-bx+c,b is an odd positive integer. Given that f(x)=0 has two prime numbers as roots and b+c=35. If the least value of f(x) AA x in R" is "lambda," then "[|lambda/3|] is equal to (where [.] denotes greatest integer function)

Let f (x+y)=f (x) f(y) AA x, y in R , f (0)ne 0 If f (x) is continous at x =0, then f (x) is continuous at :

Let f(x)=ax^(2)+bx+c AA a,b,c in R,a!=0 satisfying f(1)+f(2)=0. Then,the quadratic equation f(x)=0 must have :

Let f(x)=x^(2)+ax+b. If AA x in R, there exist a real value of y such that f(y)=f(x)+y, then find themaximum value of 100a.

For any ral number b, let f (b) denotes the maximum of | sin x+(2)/(3+sin x)+b|AAxx x in R. Then the minimum valur of f (b)AA b in R is: