Step 1:

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The function is $\"\"$ .

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Maclaurin series is $\"\"$

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Find consecutive derivatives of the function to know the pattern of the n th derivative of the function.

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$\"\"$

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Differentiate with respect to $\"\"$ on each side.

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$\"\"$

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$\"\"$

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$\"\"$

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Similarly, we can write $\"\"$ .

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Find the values of the above functions at 0.

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$\"\"$

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$\"\"$

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$\"\"$

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$\"\"$

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$\"\"$ .

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Step 2:

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Substitute above values in the Maclaurin series formula.

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$\"\"$

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Maclaurin series of the function $\"\"$ is $\"\"$

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Find the radius of convergence using ratio test.

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The series is $\"\"$ .

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

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$\"\"$

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$\"\"$

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By the ratio test the series is convergent when $\"\"$ .

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Hence the radius of convergence is $\"\"$ .

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Solution:

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Maclaurin series of the function $\"\"$ is $\"\"$ .

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Radius of convergence is $\"\"$ .

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