Consider the equation ||x-1|-1| = px + c. Match the number of solution with the value of p and c.

Consider the equation |x+2|+|x-2|=4-px The equation has one solution if p is

Consider the equation (2)/(x)+(5)/(y)=(1)/(3) where x,y in N. Find the number of solutions of the equation.

Consider the equation of the form x^(2)+px+q=0 , then number of such equations that have real roots and have coefficients p and q in the set {1,2,3,4,5,6} (p may be equal to q) is

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 ?

One root of the equation x^(2) = px +q is reciprocal of the other and p!=pm1 . What is the value of q ?

The roots x_(1) and x_(2) of the equation x^(2) +px +12=0 are such that their differences is 1. then the positive value of p is

The roots x_(1) and x_(2) of the equation x^(2) +px +12=0 are such that their differences is 1. then the positive value of p is

Find the number of solution of |ln(x)|-px=0 for p in(0,(1)/(e))

Let p be an integer such that both roots of the equation 5x^(2)-5px+(66p-1)=0 are positive integers.Find the value of p

Given that a,c are the roots of the equation px^2-3x+2=0 and b,d are the roots of the equation qx^2-4x+2=0 , find the values of p and q such that 1/a,1/b,1/c and 1/d are in A.P.