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(1 point) Does the geometric series 10 + 1% + 1%? + 2? + 13:4 +. . . converge or diverge? If it dues converge,
(1 point) Does the geometric series 10 + 1% + 1%? + 2"? + 13:4 +. . . converge or diverge? If it dues converge, nd its value. Enter answers as exact values. 10 10 2 10 3 10 4 0" {a} The series can be written as 10 + e + I; + E 1 1r: i . . . . E a.\" Where an 2 , F \":0 (b) The ratio for this geometric series is r =D and r is - ? v , so this series ? v {c)10 I 1:3 + 1092 I was i 1084+..._[:]([ftheseriesdivergestype DNE.) W2 3 ' {1 point} 00 m 00 . . 1 . . . . Consider the series E an where a] : 2 and \":1 : 3 for n 2 1. Write the sum 2 an as a geometric series in the town E gr". Then state whether the 11:1 13:1 11:1 series converges or diverges. if the series does converge, nd its value. (I! 00 {a} Zn\" = 2U 11:1 11:1 {[3} The series ? v (:0 (c) The value of the series 2 an is B (Enter DNE if the series diverges.) \"=1
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