One of the roots of equation `x^(2)+mx-5=0` is 2 find m.

The quadratic equation whose roots are the arithmetic and harmonimeans between the roots of the equation lx^(2)+mx+n=0 is

If the roots of the equation lx^(2) +mx +m=0 are in the ratio p:q, then

If sintheta and costheta " are the roots of the equation " mx^(2)+nx+1=0 , then find the relation between m and n.

If a and p are the roots of the equation x^2-6x +5=0 , then find the equation having the roots 2a and 2p

2x^(2) + 3x - alpha - 0 " has roots "-2 and beta " while the equation "x^(2) - 3mx + 2m^(2) = 0 " has both roots positive, where " alpha gt 0 and beta gt 0. If the roots of the equation x^(2) + px+ q = 0 are in the same ratio as those of the equation x^(2) +lx + m = 0 , then which one of the following is correct ?

Let real and distinct roots of equation x^(2)-mx+4=0 lies in [1,5] then range of m is (a) (3,4)(b)(4,5)(c)(-5,-4)(d)(-3,4)

If x=2 and x=3 are roots of the equation 3x^(2)-mx+2n=0 , then find the values of m and m.

If one roots of the equation x^(2) - mx + n = 0 is twice the other root, then show that 2m^(2) = 9pi .