Power Series – Radius of convergence to a series about (-1) – Exercise 2934 Post category:Power Series Post comments:0 Comments Exercise Determine the radius of convergence and interval of convergence for the following power series (x+1)+(x+2)22⋅4+(x+1)23⋅42+(x+1)44⋅43+...(x+1)+\frac{{(x+2)}^2}{2\cdot 4}+\frac{{(x+1)}^2}{3\cdot 4^2}+\frac{{(x+1)}^4}{4\cdot 4^3}+...(x+1)+2⋅4(x+2)2+3⋅42(x+1)2+4⋅43(x+1)4+... Final Answer Show final answer [−5,3)[-5,3)[−5,3) Solution Coming soon… Share with Friends Read more articles Previous PostPower Series – Radius of convergence to a series with n factorial about 3 – Exercise 2949 Next PostPower Series – Radius of convergence to an alternating series with even powers – Exercise 2921 You Might Also Like Power Series – Radius of convergence to a series with a polynomial – Exercise 2880 January 31, 2019 Power Series – Radius of convergence to an alternating series with a polynomial in the denominator – Exercise 2883 January 31, 2019 Power Series – Radius of convergence to a series with a multiplication of a polynomial and an exponential in the denominator – Exercise 2897 January 31, 2019 Power Series – Radius of convergence to an alternating series with even powers – Exercise 2921 February 1, 2019 Power Series – Radius of convergence to a series with n factorial about 3 – Exercise 2949 February 1, 2019 Power Series – Radius of convergence to a series with n factorial in the denominator – Exercise 2976 February 2, 2019 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ
Power Series – Radius of convergence to an alternating series with a polynomial in the denominator – Exercise 2883 January 31, 2019
Power Series – Radius of convergence to a series with a multiplication of a polynomial and an exponential in the denominator – Exercise 2897 January 31, 2019
Power Series – Radius of convergence to an alternating series with even powers – Exercise 2921 February 1, 2019
Power Series – Radius of convergence to a series with n factorial about 3 – Exercise 2949 February 1, 2019
Power Series – Radius of convergence to a series with n factorial in the denominator – Exercise 2976 February 2, 2019