2
answers
0
watching
25
views
22 Dec 2022
(:) Problem 5: Let N = -In N. Show that 0ã 1, for all N-1, and show that the n= 1 sequence {7x}N=ja is decreasing (i.e., γã 72 > γ3 > . . .). [Hint: relate to areas. Note on Problem 5: With N being decreasing and bounded below (by 0), the limit exists! This number γ 0.57721 . . . is known as Euler's constant.
(:) Problem 5: Let N = -In N. Show that 0ã 1, for all N-1, and show that the n= 1 sequence {7x}N=ja is decreasing (i.e., γã 72 > γ3 > . . .). [Hint: relate to areas. Note on Problem 5: With N being decreasing and bounded below (by 0), the limit exists! This number γ 0.57721 . . . is known as Euler's constant.
2
answers
0
watching
25
views
For unlimited access to Homework Help, a Homework+ subscription is required.
Keith LeannonLv2
23 Dec 2022
Unlock all answers
Get 1 free homework help answer.
Already have an account? Log in
23 Dec 2022
Get unlimited access
Already have an account? Log in