If `ax^2 + bx + c = 0 and bx^2 + cx+a= 0` have a common root and `a!=0` then `(a^3+b^3+c^3)/(abc)` is

If the equation x^2+2x+3=0 and ax^2+bx+c=0 have a common root then a:b:c is

If a, b, c are in GP , then the equations ax^2 +2bx+c = 0 and dx^2 +2ex+f =0 have a common root if d/a , e/b , f/c are in

If ax^2+bx+c=0 and 2x^2+3x+4=0 have a common root, where a, b, c in N (set of natural numbers), the least value of a + b +c is:

ax^2 + bx + c = 0(a > 0), has two roots alpha and beta such alpha 2, then

If the quadratic equations, a x^2+2c x+b=0 and a x^2+2b x+c=0(b!=c) have a common root, then a+4b+4c is equal to:

If a,b,c are in GP, show that the equations ax^(2)+2bx+c=0 and dx^(2)+2ex+f=0 have a common root if a/d,b/e,c/f are in

If x^2+3x+5=0a n da x^2+b x+c=0 have common root/roots and a ,b ,c in N , then find the minimum value of a+b+ c dot

If equations ax^(2)+bx+c=0 (where a,b,c epsilonR and a!=0 ) and x^(2)+2x+3=0 have a common root, then show that a:b:c=1:2:3

If f(x)=x^3+bx^2+cx+d and 0< b^2 < c , then

If a, b in R and ax^2 + bx +6 = 0,a!= 0 does not have two distinct real roots, then :