Consider the Power Serics E (nt6) xh Find the radius of Conuzrgince R= ? what is the interval of convergun ce s ( in interval not ation')

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**Topic: Power Series and Convergence** **Problem Statement:** Consider the power series: \[ \sum_{n=1}^{\infty} (n+6)x^n \] 1. **Find the radius of convergence.** \( R = ? \) 2. **Determine the interval of convergence.** Provide your answer in interval notation. --- **Discussion:** - The given series is a power series of the form \(\sum_{n=1}^{\infty} a_n x^n\), where \(a_n = n + 6\). - To find the radius of convergence, we will use the formula derived from the root test or the ratio test. - Once \(R\) is found, the interval of convergence can be determined by testing endpoints within the derived interval. Please solve the exercise above based on the steps described.