What are the possible integral zeros of $P(p)=p^4-2p^3-8p^2+3p-4$ ?

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What are the possible integral zeros of $P(p)=p^4-2p^3-8p^2+3p-4$ ?

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Answer 1 · 2017-01-14T00:40:45

The "possible" integral zeros are: $+-1, +-2, +-4$

Actually $P(p)$ has no rational zeros.

Explanation:

Given:

$P(p) = p^4-2p^3-8p^2+3p-4$

By the rational roots theorem, any rational zeros of $P(p)$ are expressible in the form $p/q$ for integers $p, q$ with $p$ a divisor of the constant term $-4$ and $q$ a divisor of the coefficient $1$ of the leading term.

That means that the only possible rational zeros (which also happen to be integers) are:

$+-1, +-2, +-4$

In practice we find that none of these are actually zeros, so $P(p)$ has no rational zeros.

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What are the possible integral zeros of $P(p)=p^4-2p^3-8p^2+3p-4$ ?

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What are the possible integral zeros of P(p)=p^4-2p^3-8p^2+3p-4P(p)=p^4-2p^3-8p^2+3p-4?

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What are the possible integral zeros of $P(p)=p^4-2p^3-8p^2+3p-4$ ?