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Recent Posts
- More Fun With Combinatorics: A Very Short Post
- The probability that $s$ integers are relatively $r$-prime for a class of probability distributions on the integers
- Fun Polynomial Problem
- On The Product of All Primes Between $N$ and $2N$ Compared to $2^{N}$
- All Harmonic Series Diverge — And a Consequence!
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More Fun With Combinatorics: A Very Short Post
One of my favorite facts from combinatorics is that $\sum\limits_{0\leq k\leq n}\binom{n}{k} = 2^{n}$. To prove it is simple: Note that $2 = 1 + 1$, and that $\binom{n}{k} = \binom{n}{k}\cdot 1^{k}\cdot 1^{n-k}$, and appeal to binomial theorem: $$\sum_{0\leq k\leq … Continue reading
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The probability that $s$ integers are relatively $r$-prime for a class of probability distributions on the integers
For each real number $t>1$, one can define a probability distribution $P_{t} = \left\{\mathrm{pr}_{t}\left(n\right)\right\}_{n\in\mathbb{N}}$ by $\mathrm{pr}_{t}\left(n\right) = \displaystyle{\frac{n^{-t}}{\zeta\left(t\right)}}$. This class of probability functions was studied by Golomb in [1]. In this post, we will prove a theorem about relatively $r$-prime … Continue reading
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Fun Polynomial Problem
I was recently introduced to an interesting polynomial problem. Problem. Determine all polynomials $p\left(x\right)\in \mathbb{R}\left[x\right]$ such that $\left(x – 16\right)p\left(2x\right) = 16\left(x – 1\right)p\left(x\right)$ for all $x\in \mathbb{R}$.
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On The Product of All Primes Between $N$ and $2N$ Compared to $2^{N}$
While reading some course notes from MIT 18.703 (Modern Algebra), I came across the following statement on page 3: Lemma 22.3. The product of all primes $r$ between $N$ and $2N$ is greater than $2^{N}$. However, this can quickly be … Continue reading
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The probability that $s$ positive integers chosen according to the binomial distribution are relatively $r$-prime.
In two papers of Nymann and Leahey from the mid-to-late 70’s, they determined the asymptotics of the probabilities of selecting $k$ relatively prime integers [1] and selecting an integer which is $k$-free [2] according to the uniform and binomial distributions. … Continue reading
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Some Fun with Combinatorics: How many ways can you give 10 one-dollar bills to 3 people?
Yesterday, I was made aware of an elementary combinatorics problem, and the solution was surprisingly clever (at least it is to me, though I am not an expert in the area). Suppose that a philanthropist decides to give a total … Continue reading
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On Sums of Reciprocals with Logarithmic Factors (or, The Generalized $p$-Series Test)
I saw this post on Reddit and was quite interested in it. I decided to investigate things on my own for a bit. We’ll start with the statement of the Cauchy Condensation Test.
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Site Transfer Complete!
I have just finished moving all of my posts from the old location of this blog from a free webhost. I hope to be more productive from now on!
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