Highest Voted Questions - Mathematics Stack Exchange

431

votes

22 answers

On "familiarity" (or How to avoid "going down the Math Rabbit Hole"?)

Anyone trying to learn mathematics on his/her own has had the experience of "going down the Math Rabbit Hole." For example, suppose you come across the novel term vector space, and want to learn more about it. You look up various definitions, and…

soft-question self-learning

asked Dec 24 '13 at 22:08

kjo

13,920
9
44
83

394

votes

32 answers

Pedagogy: How to cure students of the "law of universal linearity"?

One of the commonest mistakes made by students, appearing at every level of maths education up to about early undergraduate, is the so-called “Law of Universal Linearity”: $$ \frac{1}{a+b} \mathrel{\text{“=”}} \frac{1}{a} + \frac{1}{b} $$ $$ 2^{-3}…

algebra-precalculus education

asked Jan 07 '14 at 16:10

Peter LeFanu Lumsdaine

8,812
6
27
55

393

votes

1 answer

The Ring Game on $K[x,y,z]$

I recently read about the Ring Game on MathOverflow, and have been trying to determine winning strategies for each player on various rings. The game has two players and begins with a commutative Noetherian ring $R$. Player one mods out a nonzero…

commutative-algebra combinatorial-game-theory noetherian

asked Jun 16 '12 at 03:40

Alex Becker

59,563
8
127
184

380

votes

37 answers

If $AB = I$ then $BA = I$

If $A$ and $B$ are square matrices such that $AB = I$, where $I$ is the identity matrix, show that $BA = I$. I do not understand anything more than the following. Elementary row operations. Linear dependence. Row reduced forms and their…

linear-algebra matrices inverse

asked Sep 02 '10 at 07:04

Dilawar

5,955
6
28
36

376

votes

15 answers

Can every proof by contradiction also be shown without contradiction?

Are there some proofs that can only be shown by contradiction or can everything that can be shown by contradiction also be shown without contradiction? What are the advantages/disadvantages of proving by contradiction? As an aside, how is proving by…

logic proof-writing propositional-calculus proof-theory

asked Nov 24 '12 at 15:31

sonicboom

9,683
10
46
81

374

votes

73 answers

'Obvious' theorems that are actually false

It's one of my real analysis professor's favourite sayings that "being obvious does not imply that it's true". Now, I know a fair few examples of things that are obviously true and that can be proved to be true (like the Jordan curve theorem). But…

soft-question big-list

asked Jun 04 '14 at 17:38

beep-boop

11,315
11
44
72

374

votes

20 answers

Find five positive integers whose reciprocals sum to $1$

Find a positive integer solution $(x,y,z,a,b)$ for which $$\frac{1}{x}+ \frac{1}{y} + \frac{1}{z} + \frac{1}{a} + \frac{1}{b} = 1\;.$$ Is your answer the only solution? If so, show why. I was surprised that a teacher would assign this kind of…

algebra-precalculus egyptian-fractions

asked Jan 30 '13 at 09:31

Low Scores

4,505
5
22
26

373

votes

23 answers

Zero to the zero power – is $0^0=1$?

Could someone provide me with a good explanation of why $0^0=1$? My train of thought: $x>0$ $0^x=0^{x-0}=0^x/0^0$, so $0^0=0^x/0^x=\,?$ Possible answers: $0^0\cdot0^x=1\cdot0^0$, so $0^0=1$ $0^0=0^x/0^x=0/0$, which is undefined PS. I've read the…

algebra-precalculus exponentiation indeterminate-forms faq

asked Nov 20 '10 at 23:02

Stas

3,981
3
15
7

355

votes

110 answers

Collection of surprising identities and equations.

What are some surprising equations/identities that you have seen, which you would not have expected? This could be complex numbers, trigonometric identities, combinatorial results, algebraic results, etc. I'd request to avoid 'standard' / well-known…

soft-question big-list

asked Sep 26 '13 at 00:45

Calvin Lin

64,329
5
72
153

354

votes

23 answers

Why don't we define "imaginary" numbers for every "impossibility"?

Before, the concept of imaginary numbers, the number $i = \sqrt{-1}$ was shown to have no solution among the numbers that we had. So we declared $i$ to be a new type of number. How come we don't do the same for other "impossible" equations, such…

soft-question

asked Dec 15 '12 at 23:36

Lily Chung

3,603
3
15
21

351

votes

31 answers

Is it true that $0.999999999\ldots=1$?

I'm told by smart people that $$0.999999999\ldots=1$$ and I believe them, but is there a proof that explains why this is?

real-analysis algebra-precalculus real-numbers decimal-expansion

asked Jul 20 '10 at 19:23

Michael Haren

308
3
7
11

349

votes

8 answers

Calculating the length of the paper on a toilet paper roll

Fun with Math time. My mom gave me a roll of toilet paper to put it in the bathroom, and looking at it I immediately wondered about this: is it possible, through very simple math, to calculate (with small error) the total paper length of a toilet…

calculus integration summation recreational-mathematics

asked Jan 30 '16 at 22:00

Enrico M.

25,565
9
37
54

348

votes

11 answers

What is the importance of eigenvalues/eigenvectors?

linear-algebra soft-question eigenvalues-eigenvectors

asked Feb 23 '11 at 02:31

Ryan

5,309
6
19
10

348

votes

7 answers

How can you prove that a function has no closed form integral?

In the past, I've come across statements along the lines of "function $f(x)$ has no closed form integral", which I assume means that there is no combination of the operations: addition/subtraction multiplication/division raising to powers and…

real-analysis calculus integration faq differential-algebra

asked Jul 20 '10 at 22:17

Simon Nickerson

5,461
3
22
29

343

votes

0 answers

Limit of sequence of growing matrices

Let $$ H=\left(\begin{array}{cccc} 0 & 1/2 & 0 & 1/2 \\ 1/2 & 0 & 1/2 & 0 \\ 1/2 & 0 & 0 & 1/2\\ 0 & 1/2 & 1/2 & 0 \end{array}\right), $$ $K_1=\left(\begin{array}{c}1 \\ 0\end{array}\right)$ and consider the sequence of matrices defined by $$ K_L =…

linear-algebra matrices convergence-divergence operator-theory

asked Dec 14 '12 at 15:37

Eckhard

7,575
3
21
30

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