If `P(x)=ax^2+bx+c`, `Q(x)=-ax^2+dx+c` where `ac!=0` then `P(x).Q(x)=0` has

Let for a != a_1 != 0 , f(x)=ax^2+bx+c , g(x)=a_1x^2+b_1x+c_1 and p(x) = f(x) - g(x) . If p(x) = 0 only for x = -1 and p(-2) = 2 then the value of p(2) .

Consider the function f(x)=((ax+1)/(bx+2))^(x) , where a,bgt0 , the lim_(xtooo)f(x) is

If f(x) is a cubic polynomial x^3 + ax^2+ bx + c such that f(x)=0 has three distinct integral roots and f(g(x)) = 0 does not have real roots, where g(x) = x^2 + 2x - 5, the minimum value of a + b + c is

Consider two quadratic expressions f(x) =ax^2+ bx + c and g (x)=ax^2+px+q,( 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

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 f(x)= ax^(2)+bx+c,a,b,c in R and eqation f(x)-x=0 has imaginary roots alpha,beta,gamma "and " delta be the roots of f(x) -x=0 then |{:(1,alpha,delta),(beta,0,alpha),(gamma,beta,1):}| is

If (a+bx)/(a-bx) =(b+cx)/(b-cx) =(c + dx)/(c-dx) (x ne 0) , then show that a,b,c and d are G.P.

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 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:

If (a+bx)/(a-bx)=(b +cx)/(b-cx)=(c+dx)/(c-dx) (x ne 0) , then show that a, b, c and d are in G.P.