If the equations :
`x^(2) + 2x + 3 = 0 and ax^(2) + bx + c =0 a, b,c in` R,
Have a common root, then a: b : c is :

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

If the equations a x^(2)+2 b x+c-0 and a x^(2)+2 c x+b=0 , b ne c have a common root, then (a)/(b+c)=

If x^(2) + ax + b = 0 and x^(2) + bx + a = 0 have a common root, then the numberical value of a + b is :

If a,b,c are in G.P.L, then the equations ax^(2) + 2bx + c = 0 0 and dx^(2) + 2ex+ f = 0 have a common root if ( d)/( a) , ( e )/( b ) , ( f )/( c ) are in :

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

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 the equations x^(2)+a x+b=0 and x^(2)+b x+a=0(a ne b) have a common root, then a+b=

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

Find the condition that quadratic equations x^(2)+ax+b=0 and x^(2)+bx+a=0 may have a common root.

A value of b for which the equations : x^(2) + bx - 1= 0, x^(2) + x + b = 0 Have one root in common is :