How do you use the rational roots theorem to find all possible zeros of f(x)=3x3+39x2+39x+27?

1 Answer
George C.
Mar 25, 2016

See explanation...

Explanation:

Before applying the rational roots theorem, note that all of the coefficients are divisible by 3, so separate that out as a factor first:

f(x)=3x3+39x2+39x+27=3(x3+13x2+13x+9)

Then applying the rational roots theorem to the remaining cubic factor, we can deduce that any rational zeros of f(x) must be expressible in the form pq for integers p, q where p is a divisor of the constant term 9 and q a divisor of the coefficient 1 of the leading term.

That means that the only possible rational zeros are:

±1, ±3, ±9

In addition note that all of the coefficients are positive, so there are no zeros for positive values of x. So the only possible rational zeros are:

1, 3, 9

None of these is a zero, so f(x) has no rational zeros.

That is as much as we can learn from the rational roots theorem.

In fact f(x) has one Real irrational zero near 12 and a pair of Complex zeros.

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