For `f(x)=x^(3)+bx^(2)+cx+d`, if `b^(2) gt 4c gt 0` and `b, c, d in R`, then f(x)

Let f(x) = ax^(3) + bx^(2) + cx + d, a != 0 , where a, b, c, d in R . If f(x) is one-one and onto, then which of the following is correct ?

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

Let f(x)=ax^(5)+bx^(4)+cx^(3)+dx^(2)+ ex , where a,b,c,d,e in R and f(x)=0 has a positive root. alpha . Then,

Let f(x) = ax^(2) - bx + c^(2), b ne 0 and f(x) ne 0 for all x in R . Then

If f(x) = a + bx + cx^2 where a, b, c in R then int_o ^1 f(x)dx

If f(x)=(ax + b)sinx+(cx +d)cos x , then the values of a b, c and d such that f"(x)=xcos x for all x, then (a + b + c + d)is

Let f (x) =ax ^(2) + bx+ c,a gt = and f (2-x) =f (2+x) AA x in R and f (x) =0 has 2 distinct real roots, then which of the following is true ?

Let a, b, c in R with a gt 0 such that the equation ax^(2) + bcx + b^(3) + c^(3) - 4abc = 0 has non-real roots. If P(x) = ax^(2) + bx + c and Q(x) = ax^(2) + cx + b , then (a) P(x) gt 0 for all x in R and Q(x) lt 0 for all x in R . (b) P(x) lt 0 for all x in R and Q(x) gt 0 for all x in R . (c) neither P(x) gt 0 for all x in R nor Q(x) gt 0 for all x in R . (d) exactly one of P(x) or Q(x) is positive for all real x.

If f(x)=ax^(2)+bx+c, f(-1) gt (1)/(2), f(1) lt -1 and f(-3)lt -(1)/(2) , then

If b^(2) lt 2ac , the equation ax^(3)+bx^(2)+cx+d=0 has (where a, b, c, d in R and a gt 0 )