[" 17.Find the values of "p" and "q" so that "f(x)={[x^(2)+3x+p," if "x<=1],[qx+2," if "x>1]],[" is differentiable at "x=1]

Find the values of p and q , so that f(x)={{:(x^(2)+3x+p, ifxle1),(qx+2,ifx gt1):} is differentiable at x = 1

Find the values of p and q , so that f(x)={{:(x^(2)+3x+p, ifxle1),(qx+2,ifx gt1):} is differentiable at x = 1

Find the values of p and q, so that f(x) = {(x^(2) + 3x + p,x le 1),(qx + 2,x gt 1):} is differentiable at x=1.

Find the values of a and b so that the function f(x)={x^2+3x+a , bx2 ,ifxlt=1ifx >1 is differentiable at each xRdot

Find the values of p and q so that x^(4)+px^(3)+2x^(2)-3x+q is divisible by (x^(2)-1)

Find the value of k if x+1 is a factor of p(x):p(x)=kx^(2)+3x+k

Find the values of p\ a n d\ q so that x^4+p x^3+2x^2-3x+q is divisible by (x^2-1)

If the function f (x) defined below is differentiable at x = 1 then find the values of p and q . f(x)={{:(x^(2)+3x+p",","when "xle1),(qx+3",","when "xgt1):}

Find the value of f(0) so that f (x) = (1 + 2x)^(1//3x) is continuous at x = 0

Let f(x)={(x^3+2x^2,x in Q),(-x^3+2x^2+ax, x !in Q)) , then the integral value of 'a' so that f(x) is differentiable at x=1 is