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Python · 3 人关注
auto-anime-downloader
A tiny python script to download torrents of anime on air from specific web site automatically.
JavaScript · 2 人关注
exports-lock
A library to protect integrity of packages in Node.js
JavaScript · 2 人关注
frontend-lab
Some code snippets when learning something new
1 人关注
ant-design
An enterprise-class UI design language and React UI library
JavaScript · 1 人关注
aqua-button
TypeScript · 1 人关注
aquarium
A private helper based on Telegram Bot API
C# · 1 人关注
ASCII_ART_Video_Console_Player
A simple ASCII art video player using console. (containing a converter)
1 人关注
Ayase-252
HTML · 1 人关注
Ayase-252.github.io
my personal blog
CSS · 1 人关注
ayase-blog
My personal blog with Django
CSS · 1 人关注
ayase-blog-next
Blog framework powered by Django and Vue
TypeScript · 1 人关注
bangumi-frontend
Stylus · 1 人关注
blog-backup
Matlab · 1 人关注
bp-neural-network
An implementation of basic back propagation neural network in MATLAB.
1 人关注
center-notes-repo
A repository to keep my notes synchronized in different devices
C++ · 1 人关注
Circuit_Calculator
A shell-based calculator which is optimized for circuit design
C++ · 1 人关注
ControllerLib
Library of advanced control algorithm
HTML · 1 人关注
coursera-angularjs
solution repo of SPA with AngularJS in coursera
JavaScript · 1 人关注
cypress-zepto-issue
demo of cypress issue with zepto
JavaScript · 1 人关注
dike
Electron app to automate justice
1 人关注
DMCA-takedown
For our loved Bilibili
JavaScript · 1 人关注
docz-issue-reproduce
Python · 1 人关注
experiment-helper
A helper assisting to conduct controlled experiments with many sets of parameters to try.
1 人关注
field-form
⚡️ React Performance First Form Component
JavaScript · 1 人关注
frontend-nanodegree-resume
1 人关注
gatsby-theme-antv
⚛️ Polished Gatsby theme for documentation site
0 人关注
bangumi-server-private
HTTP sever for private api
0 人关注
clash
A rule based proxy in Go.
0 人关注
fragmenter
Easy to configure and resilient modular update system
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ayase252V2EX 第 241507 号会员,加入于 2017-07-20 01:10:06 +08:00今日活跃度排名 8319 |
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2 天前 回复了 Persimmon08 创建的主题 › OpenAI › 这个问题,大家的 GPT 都能答对吗? |
gemini pro
Here's how to find the limits of x*ln(1+1/x) as x approaches 0 and positive infinity:
Case 1: x approaches 0
We cannot directly substitute x = 0 into the expression, as it results in an indeterminate form. Let's use L'Hôpital's rule:
Rewrite the expression:
x*ln(1+1/x) = ln(1+1/x) / (1/x)
Now the form is suitable for L'Hôpital's rule (both numerator and denominator approach 0 as x approaches 0).
Apply L'Hôpital's Rule:
lim (x->0) [ln(1+1/x) / (1/x)] = lim (x->0) [d/dx(ln(1+1/x)) / d/dx(1/x)]
= lim (x->0) [-1/(x+x^2) / (-1/x^2)]
= lim (x->0) [x / (1+x)] = 0
Therefore, the limit of x*ln(1+1/x) as x approaches 0 is 0.
Case 2: x approaches positive infinity
Rewrite the expression:
x*ln(1+1/x) = ln(1 + 1/x) / (1/x)
Again, this is an indeterminate form (both numerator and denominator approach 0 as x approaches infinity).
Apply L'Hôpital's Rule:
lim (x-> ∞) [ln(1 + 1/x) / (1/x)] = lim (x-> ∞) [d/dx(ln(1 + 1/x)) / d/dx(1/x)]
= lim (x-> ∞) [-1/(x+x^2) / (-1/x^2)]
= lim (x-> ∞) [x / (x+1)]
= 1 (dividing both numerator and denominator by x)
Therefore, the limit of x*ln(1+1/x) as x approaches positive infinity is 1.
Here's how to find the limits of x*ln(1+1/x) as x approaches 0 and positive infinity:
Case 1: x approaches 0
We cannot directly substitute x = 0 into the expression, as it results in an indeterminate form. Let's use L'Hôpital's rule:
Rewrite the expression:
x*ln(1+1/x) = ln(1+1/x) / (1/x)
Now the form is suitable for L'Hôpital's rule (both numerator and denominator approach 0 as x approaches 0).
Apply L'Hôpital's Rule:
lim (x->0) [ln(1+1/x) / (1/x)] = lim (x->0) [d/dx(ln(1+1/x)) / d/dx(1/x)]
= lim (x->0) [-1/(x+x^2) / (-1/x^2)]
= lim (x->0) [x / (1+x)] = 0
Therefore, the limit of x*ln(1+1/x) as x approaches 0 is 0.
Case 2: x approaches positive infinity
Rewrite the expression:
x*ln(1+1/x) = ln(1 + 1/x) / (1/x)
Again, this is an indeterminate form (both numerator and denominator approach 0 as x approaches infinity).
Apply L'Hôpital's Rule:
lim (x-> ∞) [ln(1 + 1/x) / (1/x)] = lim (x-> ∞) [d/dx(ln(1 + 1/x)) / d/dx(1/x)]
= lim (x-> ∞) [-1/(x+x^2) / (-1/x^2)]
= lim (x-> ∞) [x / (x+1)]
= 1 (dividing both numerator and denominator by x)
Therefore, the limit of x*ln(1+1/x) as x approaches positive infinity is 1.
9 天前 回复了 ashin 创建的主题 › 分享创造 › 写了一个简化版退休金在线估算器,算算你退休时可以领多少养老金 |
2050 年想 60 退休,想多了
36 天前 回复了 drymonfidelia 创建的主题 › 问与答 › IPv4 总量也是固定、不可能增发的,为什么没有涨到 BTC 这种价格? |
你并不拥有 IP 地址,运营商说收回就收回哪来的价值
38 天前 回复了 yyqxjwxy 创建的主题 › 生活 › 问下大家 30 岁的人不会开车也不买车也不学驾照算失败吗? |
只能说有没有这个需求,上升到成功失败没必要
45 天前 回复了 Z1R0 创建的主题 › 电动汽车 › 君子约定,猜测小米 SU7 价格,胜者为最贴近 3.28 公布丐版实际价格的人,参与回复的人每人送他 10 铜币。 |
27.1w
47 天前 回复了 fields 创建的主题 › 程序员 › 你有多久没有打开过 GitHub 了? |
10s 前
47 天前 回复了 northbrunv 创建的主题 › 投资 › 如果 5 年前投资英伟达 50w,如今已成千万富翁 |
后视镜投资不可取,就周五回调的 -6% 有几个人能拿住?
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