Step 1 :

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The equation is $\"image\"$ .

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Consider $\"image\"$ .

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$\"\"$

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This is the critical point of $\"image\"$ .

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The function is a decreasing function, when $\"\"$ , and

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The function is an increasing function, when $\"\"$ .

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$\"\"$

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If $\"\"$ , then $\"\"$ for all values of $\"\"$ , and hence it has no real roots.

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If $\"\"$ , then $\"image\"$ has a single real zero at $\"\"$ .

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If $\"\"$ , then $\"\"$ .

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Find $\"\"$ -values to the left and right of $\"\"$ , where $\"\"$

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Use Intermediate Value Theorem to infer that $\"image\"$ has two real roots.

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Consider $\"\"$ .

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$\"\"$

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At $\"\"$ , $\"\"$ .

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Consider $\"\"$ .

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$\"\"$

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At $\"\"$ , $\"\"$ .

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Since $\"\"$ , apply the intermediate theorem to state that there must be some $\"\"$ in $\"\"$ such that $\"\"$ .

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From the above cases find, that the function never have more than two real roots.

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Thus, the function $\"image\"$ has at most two real roots.

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Solution :

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The function $\"image\"$ has at most two real roots.