(1 point) Consider the following series: Find the interval of convergence. The series converges if x is in The new serie

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1 Point Consider The Following Series Find The Interval Of Convergence The Series Converges If X Is In The New Serie 1 (349.84 KiB) Viewed 13 times

(1 point) Consider the following series: Find the interval of convergence. The series converges if x is in The new series is Σ 1-1/(x-6) 6) + (x − 6) 16 Within the interval of convergence, find the sum of the series as a function of x. If x is in the interval of convergence, then the series converges to: Find the series obtained by differentiating the original series term by term. 00 ·6)²+...+ + (-1)^( Find the interval of convergence of the new series. The new series converges if x is in The new series is Σ n=0 (Enter your answer using interval notation.) n=0 (Since this sum starts at n = 0, be sure that your terms are of the form cx" so as to avoid terms including negative exponents.) (x - 6)" + ... Within the interval of convergence, find the sum of the new series as a function of x. If x is in the interval of convergence, then the new series converges to: Find the series obtained by integrating the original series term by term. 00 Find the interval of convergence of the new series. The new series converges if x is in (Enter your answer using interval notation.) # (Enter your answer using interval notation.) Within the interval of convergence, find the sum of the new series as a function of x. If x is in the interval of convergence, then the new series converges to: