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 the roots of the quadratic equation x^(2) mx+4=0 are real and distinct and they lie in the interval [1,5] then m lies in the interval

If both the roots of the quadratic equation x^(2) -mx+4=0 are real and distinct and they lie in the interval [1,5] then m lies in the interval

If both the roots of the quadratic equation x^(2) - mx + 4 = 0 are real and distinct and they lie in the interval [1, 5], then m lies in the interval

If both the roots of the quadratic equation x^(2) - mx + 4 = 0 are real and distinct and they lie in the interval [1, 5], then m lies in the interval

If both the roots of the quadratic equation x^(2) - mx + 4 = 0 are real and distinct and they lie in the interval [1, 5], then m lies in the interval

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

Find the values of the parameter a for which the roots of the quadratic equation x^(2)+2(a-1)x+a+5=0 are such that both roots lie in the interval (1, 3)

if the roots of the quadratic equation (4p - p^(2) - 5)x^(2) - 2mx + m^(2) - 1 = 0 are greater then - 2 less then 4 lie in the interval

if the roots of the quadratic equation (4p - p^(2) - 5)x^(2) - 2mx + m^(2) - 1 = 0 are greater then - 2 less then 4 lie in the interval