For what real values of k, `3x^2+kx+39-k^2` cannot be negative for any real values of x?

For what real values of x the expressions x^2-2x+3 is negative?

If alpha and beta be the roots of the equation 5x^2+bx+c=0 Show that 5x^2+bx+c=5(x-alpha)(x-beta) Show also that for all real values of x the expression 5x^2+bx+c cannot be negative if alpha and beta are real and equal

Let f(x)=a x^2+bx +c a ,b ,c in R . If f(x) takes real values for real values of x and non-real values for non-real values of x , then (a) a=0 (b) b=0 (c) c=0 (d) nothing can be said about a ,b ,c .

Prove that for real values of x ,(a x^2+3x-4)//(3x-4x^2+a) may have any value provided a lies between 1 and 7.

For any real positive value of x, show that 3-xcancelgt7/(x+2) .

The set of real values of k for which x^2 - kx + sin^-1 (sin 4) gt 0 forall x in R is

If x be real , show that the value of (2x^2-2x+4)/(x^2-4x+3) cannot lie between (-7) and 1.

if x be real, show that the value of (2x^2-2x+4)/(x^2-4x+3) cannot lie between(-7) and 1.

For real x,the least value of (x-2)(x-3)+1 is___