Questions tagged [divisibility]

This tag is for questions about divisibility, that is, determining when one thing is a multiple of another thing.

If $a$ and $b$ are integers, $a$ divides $b$ if $b=ca$ for some integer $c$. This is denoted $a\mid b$. It is usually studied in introductory courses in number theory, so add if appropriate.

A common notation used for the phrase "$a$ divides $b$" is $a|b$. It is also common to negate the notation by adding a slash like this: "$c$ does not divide $d$" written as $c\nmid d$. Note that the order is important: for example, $2|4$ but "$4\nmid 2$".

This notion can be generalized to any ring. The definition is the same: For two elements $a$ and $b$ of a commutative ring $R$, $a$ divides $b$ if $ac=b$ for some $c$ in $R$.

Divisibility in commutative rings corresponds exactly to containment the poset of principal ideals. That is, $a$ divides $b$ if and only if $aR\subseteq bR$. For commutative rings like principal ideal rings, this means that divisibility mirrors exactly the poset of all ideals of the ring.

The topics appropriate for this tag include, for example:

  • Questions about the relation $\mid$.
  • Questions about the GCD and LCM.

There are divisibility rule that is a shorthand way of determining whether a given integer is divisible by a fixed divisor without performing the division, usually by examining its digits.

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Linear congruence equations - how to determine the solutions

How can I determine the solutions of linear congruence equation solved using extended euclidean algorithm? For example: $$13x \equiv 12 \pmod{15}$$ $$\text{GCD}(13,15)=1=7(13)-6(15)$$ What's next?
khernik
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Proving $26\mid 5^{12n+3}- 21$

I need to prove that $5^{12n+3} \equiv 21 \pmod{26}.$ I probably need to use Fermat's little theorem but don't know where to start.
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divisibility of elements of a subset

Show that there are at least two elements in any subset with three elements of set $$A=\{x\in\mathbb{N}|x=a^4+a^2+1,a\in\mathbb{N}\}$$ whose difference is divisible by 10. I manage to see that if I take two elements of A, say x and y, than…
Numbers
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Find the 'square' divisors of a given even number

I don't now if I've worded the title correctly, that's probably not the name of what I'm looking for so I'll just describe it. I want to get the most equal integer divisors of a given even number. For example for 12 I would want 3 and 4 (or 4 and 3)…
Hasen
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Is the sum of two numbers, one with a divisor $d$ and another without the divisor, divisible by $d$?

For example, if we have $x + y = z$ $d \mid x$ $d \nmid y$ Can $d \mid z$ ? I'm trying to prove that it is impossible. To be more specific, I'm trying to prove that there exists $\phi(z/d)$ possible values for $x$ and $y$ with $x+y=z$, $x>0$, $y>0$…
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Prove $\forall k \in \mathbb{Z} \exists n \in \mathbb{N}$, with $1 \leq n \leq 5$, so that $5|n^3+k$

As the title says, I have to prove this. Since n just ranges from 1 to 5, I wondered if it is okay to just prove it like the following? For n=1: $5|{1}^3+k$, when $k \in${…,-11,-6,-1,4,9,14,…} For n=2: $5|{2}^3+k$, when…
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Numbers $\leq100$ not divisible by $2,3$ and $5$

I am stuck here. The result should be $26$, but I am getting an incorrect result: No.s divisible by $2= 50$ No.s divisible by $3= 33$ No.s divisible by $5= 20$ No.s divisible by $2 , 3= 14$ No.s divisible by $3 , 5= 6$ No.s divisible by $2 , 5=…
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Why does Microsoft Excel evaluate MOD($44$, $8.8$) as $8.8$?

As per my understanding, the formula function MOD in Microsoft excel should give the remainder value, after dividing two numbers. So the formula =MOD(40,8) gives a value 0. This works as expected. But the formula =MOD(44,8.8) gives a value 8.8,…
Cloud Man
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For fixed $a\ge 2$, find $n$ such that $a^2+a+1$ divides $a^{2n}+a^n+1$

For fixed $a\ge 2$, find $n$ such that $a^2+a+1$ divides $a^{2n}+a^n+1$. If the statement is about polynomials (replacing $a$ by an indeterminate $x$), then I would argue by remarking that roots of $x^2+x+1$ are third roots of unity and then would…
ters
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Why can we always find a $x$ for which that $px+a$ is always divisible by $b$?

For any $p$ prime, $b \in \{1, ..., p-1\}$ and $a \in \mathbb{N}$, why is there always a $x \in \mathbb{N_0}$ such that $b \mid px + a$?
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The integer values of $c$ for which a quotient is an integer

I want to find all the integer values of $c$ for which $\frac{c^6-3}{c^2+2}$ is an integer. By inspection $\pm 3$ is a solution. However, is there any systematic way to find all the solutions?
user1007173
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If $2^n -1$ is a prime, show that $n$ is a prime.

Solution: If $n$ is composite then $n=n_{1}n_{2}$ where $n_{1}>1$ and $n_{2}>1$. Hence, $2^{n_{1}}-1 > 1$ and $2^{n_{1}} - 1|2^{n} - 1$. Question: Why is $2^{n_{1}} - 1|2^{n} - 1$ true?
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Question on divisibility by 3. Prove that a²-36=8 is not true for any natural numbers a and b.

Prove that there are no natural numbers a and b such that a²-36b=8. A hint is given in the solutions that we should check the remainders by mod 3. But do we have to take remainders of whole expression or a and b seperately ?
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Division by zero.

Yeah i know it's an age old topic but i just had a couple shower thoughts about division by 0 and I just wanted to ask a few questions about said topic. If we assume that any system yx = z all 3 of them real numbers has a solution then I'd like to…
Glace
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what is ten divided by eighty (i have ten dollars that i want to divide into eighty groups)

Ok so if i draw out 10/80 in the oldschool format with a long division symbol what are the steps to solve? Would it be correct to say 'how many times does ten go into eighty'? I tried to draw this out then circle them into groups but then I realized…
Jordan
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