" tons of the equation "af(x)+g(x)=0

Two distinct polynomials f(x) and g(x) defined as defined as follow : f(x) =x^(2) +ax+2,g(x) =x^(2) +2x+a if the equations f(x) =0 and g(x) =0 have a common root then the sum of roots of the equation f(x) +g(x) =0 is -

The no. of solutions of the equation a^(f(x)) + g(x)=0 where a>0 , and g(x) has minimum value of 1/2 is :-

The no.of solutions of the equation a^(f(x))+g(x)=0 where a>0, and g(x) has minimum value of 1/2 is :

g(x+y)=g(x)+g(y)+3xy(x+y)AA x, y in R" and "g'(0)=-4. Number of real roots of the equation g(x) = 0 is

g(x+y)= g (x) + g(x) +3xy (x+y)AA, y in R and g'(0) = -4 Number of real roots of the equation g(x) = 0 is

g(x+y)=g(x)+g(y)+3xy(x+y)AA x, y in R" and "g'(0)=-4. Number of real roots of the equation g(x) = 0 is

g(x+y)=g(x)+g(y)+3xy(x+y)AA x, y in R" and "g'(0)=-4. Number of real roots of the equation g(x) = 0 is

g(x+y)=g(x)+g(y)+3xy(x+y)AA x, y in R" and "g'(0)=-4. Number of real roots of the equation g(x) = 0 is