Suppose that f is a polynomial of degre...

Suppose that `f` is a polynomial of degree `3` and that `f^(x)!=0` at any of the stationary point. Then `f` 1)has exactly one stationary point `f` 2)must have no stationary point `f` 3)must have exactly two stationary points `f` has 4)either zero or two stationary points.

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Suppose that f is a polynomial of degree 3 and that f^(x)!=0 at any of the stationary point. Then f1 has exactly one stationary point f 2)must have no stationary point f3 must have exactly two stationary points f has 4)either zero or two stationary points.

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Suppose that `f` is a polynomial of degree `3` and that `f^(x)!=0` at any of the stationary point. Then `f` 1)has exactly one stationary point `f` 2)must have no stationary point `f` 3)must have exactly two stationary points `f` has 4)either zero or two stationary points.

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