If both roots of the quadratic equation `x^(2)+x+p=0` exceed p where `p epsilon R`, then p must lie in the interval

If both roots of the quadratic equation (2-x)(x+1)=p are distinct & interval positive,then p must lie in the,interval

The roots of a quadratic equation x/p = p/x are

If both roots are common to the Quadratic equations x^2-4 = 0 and x^2 + px-4 = 0 , then p =

If the roots of the quadratic equation (4p-p^2-5)x^2-(2p-1)x+3p=0 lie on either side of unit, then the number of interval values of p is

If the roots of the quadratic equation 4p-p^2-5x^2-(2p-1)x+3p=0 lie on either side of unit, then the number of interval values of p is 1 b. 2 c. 3 d. 4

If the roots of the quadratic equation 4x^(2) -16x + p = 0 , are real and unequal, then find the value/s of p.

The roots of the equation (q-r)x^(2)+(r-p)x+(p-q)=0

If (1-p) is a root of the quadratic equation x^(2)+p x+(1-p)=0 then its roots are

If the roots of the quadratic equation (4p-p^2-5)x^2-(2p-1)x+3p=0 lie on either side of unity, then the number of integral values of p is