Let f(x)=x^(3)+ax^(2)+bx+c be the given ...

Let `f(x)=x^(3)+ax^(2)+bx+c` be the given cubic polynomial and `f(x)=0` be the corresponding cubic equation, where `a, b, c in R.` Now, `f'(x)=3x^(2)+2ax+b`
Let `D=4a^(2)-12b=4(a^(2)-3b)` be the discriminant of the equation `f'(x)=0`.
If `D=4(a^(2)-3b)gt0 and f(x_(1)).f(x_(2))gt0` where `x_(1),x_(2)` are the roots of f'(x), then

f(x) has all real and distinct roots

f(x) has three real roots but one of the roots would be repeated

f(x) would have just one real root

None of the above

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