The function p is defined as p(x)=`x^2-3x`. If the function q is defined as q(x)=p(x)-4, what is the value of q(10)?

f(x) = x^(2) + px + q . If p = 2q and the function has a value of 16 at x = 3, what is the value of p ?

Let ! "-be" an opertion on p and q defined as q!p=p^(2)-4pq+q^(2) . If x!1= -3, what is the value of x!(x+1)?

If p(x) = x^3+3 and q(x)= x-3 then find the value of p(x).q(x)

If p (x) = x ^(2) -4x+8 and q 9x)=x-3, what is the value of (q (p (5)))/(p (q (5))) ?

The function 'f' is defined by f(x)=x^p(1-x)^q for all x\ in R , where p ,\ q are positive integers, has a maximum value, for x equal to : (p q)/(p+q) (b) 1 (c) 0 (d) p/(p+q)

The function 'f' is defined by f(x)=x^p(1-x)^q for all x\ in R , where p ,\ q are positive integers, has a maximum value, for x equal to : (p q)/(p+q) (b) 1 (c) 0 (d) p/(p+q)

The function 'f' is defined by f(x)=x^p(1-x)^q for all x\ in R , where p ,\ q are positive integers, has a maximum value, for x equal to : (p q)/(p+q) (b) 1 (c) 0 (d) p/(p+q)

(x^(p^(2)))/(x^(q^(2)))=(x^(50))^(2) with xgt1 and p-q-4 , what is the value of p+q ?

If p and q are zeros of 3x^2+2x-9 . then value of p-q

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):}