$\"\"$

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The function is $\"\"$ and $\"\"$ .

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Definition of Taylor series:

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If a function $\"\"$ has derivatives of all orders at $\"\"$ then the series

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$\"\"$ is called Taylor series for $\"\"$ at $\"\"$ .

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First find the successive derivatives of $\"\"$ .

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$\"\"$

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Apply derivative on each side with respect to $\"\"$ .

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$\"\"$

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$\"\"$ .

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$\"\"$ .

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$\"\"$ .

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$\"\"$ .

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Find the values of the above functions at $\"\"$ .

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$\"\"$ .

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$\"\"$ .

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$\"\"$ .

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$\"\"$ .

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$\"\"$ . $\"\"$

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The series is centered at $\"\"$ .

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Taylor series centered at $\"\"$ .

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$\"\"$ . $\"\"$

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The $\"\"$ derivative of the function $\"\"$ is $\"\"$ .

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$\"\"$

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Radius of convergence :

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By the Ratio Test, the series converges if $\"\"$ .

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$\"\"$ term of the taylor series is $\"\"$ .

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$\"\"$ term of the taylor series is $\"\"$ .

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$\"\"$

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$\"\"$

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$\"\"$

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$\"\"$

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$\"\"$ .

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Condition for convergence : $\"\"$ .

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So the region of convergence is $\"\"$ .

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

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$\"\"$

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Taylor series of $\"\"$ is $\"\"$ .

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The radius of convergence is $\"\"$ .