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(a) Determine the zeros of the function and their multiplicity :

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The polynomial function is $\"\"$ .

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Definition of real zeros :

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If $\"\"$ is a function and $\"\"$ is a real number for which $\"\"$ , then $\"\"$ is called a real zero of $\"\"$ .

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From the definition of real zeros : $\"\"$ .

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$\"\"$

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$\"\"$

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$\"\"$ and $\"\"$

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$\"\"$ and $\"\"$

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The equation has no real solutions $\"\"$ .

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$\"\"$ .

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The real zeros of the polynomial function is $\"\"$ .

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The definition of zeros of multiplicity : $\"\"$ , the exponent of factor $\"\"$ is $\"\"$ .

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$\"\"$ is a zero of multiplicity $\"\"$ because the exponent on the factor $\"\"$ is $\"\"$ .

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(b) Determine whether the graph crosses or touches the $\"\"$ -axis at each $\"\"$ -intercept.

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$\"\"$ is an $\"\"$ -intercept of function $\"\"$ .

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Therefore, the $\"\"$ -intercept is $\"\"$ .

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The zero $\"\"$ is a zero of multiplicity $\"\"$ , so the graph of $\"\"$ crosses the $\"\"$ -axis at $\"\"$ .

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(c) Determine the behavior of the graph of $\"\"$ near each $\"\"$ -intercept:

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The $\"\"$ -intercept is $\"\"$ .

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Near $\"\"$ :

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$\"\"$

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$\"\"$

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$\"\"$ .

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(d) Determine the maximum number of turning points on the graph of the function:

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The polynomial function is $\"\"$ .

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Degree of the polynomial function $\"\"$ .

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Maximum number of turning points is $\"\"$ .

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$\"\"$ .

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At most $\"\"$ turning points.

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(e) Determine the end behavior of the graph of the function:

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The polynomial function is $\"\"$ .

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Expand the polynomial.

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$\"\"$

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$\"\"$

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The polynomial function $\"\"$ is of degree $\"\"$ .

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The function $\"\"$ behaves like $\"\"$ for large values of $\"\"$ .

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(a)

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$\"\"$ , multiplicity is $\"\"$ .

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(b) The graph of $\"\"$ crosses the $\"\"$ -axis at $\"\"$ .

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(c) Near $\"\"$ : $\"\"$ .

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(d) The maximum number of turning points are $\"\"$ .

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(e) The function $\"\"$ behaves like $\"\"$ for large values of $\"\"$ .