Page 1 of 1
Tutorial Exercise Evaluate the indefinite integral as an infinite series. 13 ex - 1 dx Part 1 of 3 Since exa x and the n
Posted: Sun Sep 05, 2021 5:19 pm
by answerhappygod
- Tutorial Exercise Evaluate The Indefinite Integral As An Infinite Series 13 Ex 1 Dx Part 1 Of 3 Since Exa X And The N 1 (92.71 KiB) Viewed 100 times
Tutorial Exercise Evaluate the indefinite integral as an infinite series. 13 ex - 1 dx Part 1 of 3 Since exa x and the n = 0 term equals then e* - 1 = xn n! n = 0 Part 2 of 3 n-1 Since e- 1 = Σ then 13(e* - 1) = 10x 13 x = 10x n=1 n = 1 2.1 n = 1 10n! Part 3 of 3 Now we have 13(et - 1) dx = Σ 13х – 1 = Σ + C. 10x 10n! n=1 Submit Skip_(you cannot come back) Need Help? Read It Submit Answer 7. [0/1 Points] DETAILS PREVIOUS ANSWERS SCALCCC4 8.7.047. MY NOTES ASK YOUR TEACHER PRACTICE ANOTHER Use series to approximate the definite integral I. (Give your answer correct to 3 decimal places.) I= x cos(x) dx I = 0.920 X Need Help? Read It Watch It