The table gives some values of the functions p, q and r. At which value of x does `q(x)=p(x)+r(x)`?

The table abvoe gives some value of the functions p, q, and r. At which value x does q(x)=p(x)+r(x) ?

Let alpha,beta be the roots of the equation x^(2)-px+r=0 and alpha//2,2beta be the roots of the equation x^(2)-qx+r=0 , then the value of r is (1) (2)/(9)(p-q)(2q-p) (2) (2)/(9)(q-p)(2p-q) (3) (2)/(9)(q-2p)(2q-p) (4) (2)/(9)(2p-q)(2q-p)

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)?

Let f(x)=x^(2)+2px+2q^(2) and g(x)=-x^(2)-2qx+q^(2) (where q ne0 ). If x in R and the minimum value of f(x) is equal to the maximum value of g(x) , then the value of (p^(2))/(q^(2)) is equal to

The incorrect statement is (A) p →q is logically equivalent to ~p ∨ q. (B) If the truth-values of p, q r are T, F, T respectively, then the truth value of (p ∨ q) ∧ (q ∨ r) is T. (C) ~(p ∨ q ∨ r) = ~p ∧ ~q ∧ ~r (D) The truth-value of p ~ (p ∧ q) is always T

Let px^(2)+qx+r=0 be a quadratic equation (p,q,r in R) such that its roots are alpha and beta . If p+q+rlt0,p-q+rlt0 and r gt0 , then the value of [alpha]+[beta] is (where[x] denotes the greatest integer x)________.

In a Wheatstone bridge (see fige ) Resitances P and Q are approximately equal .When R= 400 Omega the bridge is blanced .on is inerchanging P and Q ,the value of R, for balance is 405 Omega .The value of X is close to :

If the line of regression of Y on X is p_(1)x + q_(1)y + r_(1)= 0 and that of X on Y is p_(2)x + q_(2)y + r_(2)= 0 , prove that (p_(1)q_(2))/(p_(2)q_(1)) le 1

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 p, q, r be three mutually perpendicular vectors of the same magnitude. If a vector x satisfies th equation p x((x-q) x p) +q x ((x-r)xq)+rx ((x-p) x r)=0 Then x is given by :