If P(x) = `ax^(2) + bx + c ` and Q(x) = -`ax^(2) + dx + c,` where ac `ne` 0 , then P(x) . `Q(x) = 0 ` has at least :

If lim_(x rarr 0) (1 + px)^(q/x) = e^(4), where p,q in N , then

If f(x)=be^(ax)+ae^(bx) , then f" (0) =

Let f(x) = a x^2 + bx + c , where a, b, c in R, a!=0 . Suppose |f(x)| leq1, x in [0,1] , then

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 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 lim_(x rarr 0) (1+px)^(q//x) = e^(4) , where p, q, in N, then :

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 3p^(2) = 5p + 2 and 3q^(2) = 5q + 2, where p ne q , then the equation whose roots are 3p - 2q and 3q - 2p is :

Consider two quadratic expressions f(x) =ax^2+ bx + c and g (x)=ax^2+px+c,( a, b, c, p,q in R, b != p) such that their discriminants are equal. If f(x)= g(x) has a root x = alpha , then