The roots of `ax^(2)+bx+c=0, ane0` are real and unequal, if `(b^(2)-4ac)`

Study the statement carefully. Statement I : Both the roots of the equation x^(2) - x + 1 = 0 are real. Statement II : The roots of the equations ax^(2) + bx + c = 0 are real if and only b^(2) - 4ac gt 0 . Which of the following options hold?

If tan theta and sec theta are the roots of ax^(2)+bx+c=0, then prove that a^(4)=b^(2)(b^(2)-4ac)

If 'alpha and beta are roots of ax^(2)+bx+c=0 ,and roots differ by k then b^(2)-4ac=

If alpha and beta are roots of ax^(2)+bx+c=0 ,and roots differ by k then b^(2)-4ac=

If the roots of ax^(2) + bx + c are alpha,beta and the roots of Ax^(2) + Bx + C=0 are alpha- K,beta-K , then (B^(2) - 4AC)/(b^(2) - 4ac) is equal to -

The expression ax^2+2bx+b has same sign as that of b for every real x, then the roots of equation bx^2+(b-c)x+b-c-a=0 are (A) real and equal (B) real and unequal (C) imaginary (D) none of these

If b^(2)>4ac then roots of equation ax^(4)+bx^(2)+c=0 are all real and distinct if: b 0b>0,a>0,c>0(d)b>0,a<0,c<0

Assertion : 5x^(2) + 14 x + 10 = 0 has no real roots. . Reason : ax^(2) + bx + c = 0 has no real roots if b^(2) lt 4ac .

Prove that the roots of ax^(2)+2bx + c = 0 will be real distinct if and only if the roots of (a+c)(ax^(2)+2bx + c)=2(ac-.b^(2))(x^(2)+1) are imaginary.

If alpha , beta are the roots of ax^(2) +bx+c=0, ( a ne 0) and alpha + delta , beta + delta are the roots of Ax^(2) +Bx+C=0,(A ne 0) for some constant delta , then prove that (b^(2)-4ac)/(a^(2))=(B^(2)-4AC)/(A^(2)) .