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gnatopoditw

gnatopoditw

Answered question

2022-06-26

This is a question from a GRE math subject test practice material.
n = 1 n ! x 2 n n n ( 1 + x 2 n )

Answer & Explanation

Braedon Rivas

Braedon Rivas

Beginner2022-06-27Added 24 answers

Applying the root rest:
lim sup n ( n ! x 2 n n n ( 1 + x 2 n ) ) 1 / n = lim sup n x 2 n max ( 1 , x 2 ) ( n ! ) 1 / n = e 1 x 2 max ( 1 , x 2 )
The right-hand-side is bounded from about by e 1 < 1for all x, that is it converges for all x R
And if one really wants to use the ratio test, one can, though it certainly qualifies as doing things the hard way:
| lim n ( n + 1 ) ! x 2 n + 2 ( n + 1 ) n + 1 ( 1 + x 2 n + 2 ) n ! x 2 n n n ( 1 + x 2 n ) | = lim n n n ( n + 1 ) ! x 2 n + 2 ( 1 + x 2 n ) ( n + 1 ) n + 1 n ! x 2 n ( 1 + x 2 n + 2 ) = lim n n n ( n + 1 ) x 2 ( 1 + x 2 n ) ( n + 1 ) n + 1 ( 1 + x 2 n + 2 ) = lim n ( n n + 1 ) n 1 + x 2 n 1 + x 2 n + 2 = lim n ( 1 1 n + 1 ) n 1 + x 2 n 1 + x 2 n + 2 = lim n ( ( 1 1 n + 1 ) n + 1 ) n n + 1 1 + x 2 n 1 + x 2 n + 2 = 1 e lim n 1 + x 2 n 1 + x 2 n + 2 = { 1 e , if  | x | 1 0 , if  | x | > 1 < 1 .

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