If f(x) = ax + b, where a and b are integers, f(-1) = -5 and f(3) = 3, then a and b are respectively

If f(x)=ax+b , where a and b are integers, f(-1)=-5 and f(3)=3 then a and b are equal to

A function has the form f(x)=ax+b, where a and b are constants. If f(2)=1" and "f(-3)=11 , the function is defined by

B — F bond length in B F_3 and B F_4 - are respectively

Let f (x) =ax ^(2) +bx+c, where a,b,c are integers and a gt 1 . If f (x) takes the value p, a prime for two distinct integer values of x, then the number of integer values of x for which f (x) takes the value 2p is :

Let f(x) = x^2 + ax + b . If the maximum and the minimum values of f(x) are 3 and 2 respectively for 0 <= x <= 2 , then the possible ordered pair(s) of (a,b) is/are

If f(x) = y = (ax - b)/(cx - a) , then prove that f(y) = x.

Suppose f(x) =[a+b x , x 1] and lim f(x) where x tends to 1 f(x) = f(1) then value of a and b?

If f(x)=x^3+b x^2+c x+d and f(0),f(-1) are odd integers, prove that f(x)=0 cannot have all integral roots.

If f(x) =ax^(2) + bx + c satisfies the identity f(x+1) -f(x)= 8x+ 3 for all x in R Then (a,b)=

If (3sqrt3 + 5)^7 = P + F where P is an integer and F is a proper fraction, then F(P + F) =