`4x^2-9=(px+t)(px-t)`
In the equation above, p and t are constants. Which of the following could be the value of p ?

2x^2 -4x=t In the equation above, t is a constant. If the equation has no real solutions, which of the following could be the value of t ?

If P(t) = t^4-1 then find the value of P(-6) .

1/5x+1/4y=2 px+2y=16 In the system of linear equations above , p is a constant . If the system has an infinite number of solutions, what is the value of p ?

p(t)=t^(5)-3t^(4)-kt+7t^(2) In the polynomial function above, k is a nonzero constant. If p(t) is divisible by t-3, what is the value of k?

Find the value of P for which the following equation has equal roots px ^2−8x+2p=0

Let px^4+qx^3+rx^2+sx+t=|{:(x^2+3x,x-1,x+3),(x+1,-2,x-4),(x-3,x+4,3x):}| be an identity where p,q,r,s and t are constants, then the value of s is equal to

If x is the amount of adsorbate and m is the amount of adsorbent, which of the following relation is related to adsorption process? (a) (x)/(m) = f(T) at constant p (b) p = f(T) at constant ((x)/(m)) (c) (x)/(m) = p xx T (d) (x)/(m) = f(p) at constant T

If the equations x^(3)+x^(2)-4x=4 and x^(2)+px+2p=0(p in R) have two roots common,then the value of p is

If -4 is a root of the equation x^(2)+px-4=0 and the equation x^(2)+px+q=0 has coincident roots, find the values of p and q.

If -4 is a root of the equation x^(2)+px-4=0 and the equation x^(2)+px+q=0 has coincident roots, find the values of p and q.