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Jan
11
revised Limit of $\sin(x)$ as $x$ approaches zero from the left
added 427 characters in body
Dec
27
revised Prove that the $\lim_{x\to a}\sqrt[n]{x}=\sqrt[n]{a}$
added 137 characters in body; edited title
Dec
27
revised Limit of $\sin(x)$ as $x$ approaches zero from the left
added 336 characters in body
Dec
26
revised Limit of $\sin(x)$ as $x$ approaches zero from the left
title edited and tags added
Oct
15
revised Multivariable Chain Rule for partially differentiable maps
added 6 characters in body
Oct
15
revised Multivariable Chain Rule for partially differentiable maps
added 51 characters in body
Oct
15
revised Multivariable Chain Rule for partially differentiable maps
added 73 characters in body
Jun
9
revised Curve of intersection of two surfaces
added 2208 characters in body
Jun
8
revised If F is a cumulative distribution function, then $\lim_{x\to\infty}F(x)=1$
added 66 characters in body
Apr
13
revised Case C: Euler's equation in Simmon's textbook
added 1200 characters in body
Jul
12
revised Folland Proposition 1.13 Real Analysis, Second Edition
edited title
Jul
7
revised $f$ integrable, $g$ measurable, $f = g$ almost everywhere implies $g$ integrable
deleted 47 characters in body
Jun
28
revised $f, g$ measurable function on $E$ that are finite a.e. on $E$
added 1498 characters in body
Jun
26
revised If $m^*(E)=\infty$, then $E=\bigcup_{k=1}^{\infty}E_k$, $E_k$ measurable and $m^*(E_k)<+\infty$
mostly math notation editing
Mar
17
revised Evaluating $f(z)=\sqrt{z^2-1}$, given the branch I am on.
edited body
Mar
13
revised Evaluating $f(z)=\sqrt{z^2-1}$, given the branch I am on.
added 1249 characters in body
Mar
12
revised Evaluating $f(z)=\sqrt{z^2-1}$, given the branch I am on.
added 11 characters in body
Mar
11
revised Entire, $|f(z)|\le1+\sqrt{|z|}$ implies $f$ is constant
added 442 characters in body
Mar
11
revised Entire, $|f(z)|\le1+\sqrt{|z|}$ implies $f$ is constant
added 442 characters in body
Mar
10
revised Entire, $|f(z)|\le1+\sqrt{|z|}$ implies $f$ is constant
deleted 7 characters in body