1454 Happy Valentines’ Day

2020-02-142020-02-14 / ivasallay / Leave a comment

I hope that today and always you have lots of love in your heart and that you feel so much love from others. Have a wonderful Valentine’s Day!

A Valentines Puzzle

Here is a Valentines themed mystery level puzzle from me to you:

Factors of 1454

1454 is a composite number.
Prime factorization: 1454 = 2 × 727
1454 has no exponents greater than 1 in its prime factorization, so √1454 cannot be simplified.
The exponents in the prime factorization are 1, and 1. Adding one to each exponent and multiplying we get (1 + 1)(1 + 1) = 2 × 2 = 4. Therefore 1454 has exactly 4 factors.
The factors of 1454 are outlined with their factor pair partners in the graphic below.

Interesting Fact about the Number 1454:

From Stetson.edu we learn that 11+444+555+444=1454.

Mathematical Valentine Tweets I’ve Seen Today:

Happy Valentine’s Day! Mathematician @FryRsquared
talks about patterns in how we look for love in her TED Talk: https://t.co/wd4r9qrX7g pic.twitter.com/JLDt3zpJcu

— AQA Maths (@AQAMaths) February 14, 2020

Happy Valentines day 🙂 Here’s a little valentines inspired mathematical colouring to ease your class into half term this afternoon…. pic.twitter.com/hWpXUaVM3Z

— Great North Maths Hub (@GNMH_MathsHub) February 14, 2020

Wishing you all a Happy Valentine’s Day! ❤️ Share this heart curve (cardioid) and your love for mathematics with friends, loved ones and someone special your life revolves around! 😊 #ValentinesDay #50FamousCurves pic.twitter.com/zDuOWbZF2p

— Tamás Görbe (@TamasGorbe) February 14, 2020

Happy Valentine’s Day! We are grateful for all the ❤️ you have shown us and for sharing your ❤️ of #GeoGebra with your colleagues & students! https://t.co/cHpm2slGmx pic.twitter.com/msQ6sy4amI

— GeoGebra (@geogebra) February 14, 2020

I discovered these Henderson spirals with similar quadrilaterals thanks to Daniel Scher @dpscher. @jamestanton also wrote about it (link in Daniel’s blogpost). https://t.co/Or8zqrCXLT

— Vincent Pantal🍩ni (@panlepan) February 14, 2020

pic.twitter.com/5tMVUAqn5M

— MEHMET ALİ OĞUR (@maliuhud) February 13, 2020

Happy #ValentinesDay2020 ! Want to have a go at making some origami hearts? Have a read of our newsletter to find out how: https://t.co/il072Q9Eq5 ❤️ pic.twitter.com/6jjw1oSNIt

— MEI (@MEIMaths) February 14, 2020

¡Feliz #MathValentin! Te quiero 1000.#stringart @geogebra #SanValentin2020 pic.twitter.com/AopVdLxnSF

— archimedestub (@archimedestub) February 14, 2020

Apparently ‘only Smarties have the answer,’ but there’s a high probability that actually maths has the answer.
Secondary school maths teacher @Bobby_Seagull of University Challenge fame is using maths to solve his problems in dating. https://t.co/08I2S3rNIG #ValentinesDay #Maths pic.twitter.com/0iXdEiw9TJ

— IMA (@IMAmaths) February 14, 2020

Valentine day with @geogebra https://t.co/g4o276wymD #geogebra #mathart #MTBoS #ITeachMath #math #maths #mathgif #geometry #MathEd @bancoche @PerHenrikChris1 pic.twitter.com/i5IUIIMq8n

— Daniel Mentrard (@dment37) February 14, 2020

Happy Fractal Valentine’s Day! https://t.co/WyJGGApXXH pic.twitter.com/5MYOaTpXq9

— Cliff Pickover (@pickover) February 14, 2020

Si alguna vez experimentas este sentimiento, querrás volver a hacerlo. Aquella fue mi primera vez y, como el primer beso, fue muy especial. Entonces supe que podía llamarme matemático.

◼️ Edward Frenkel, Amor y Matemáticas: El corazón de la realidad oculta.#SanValentin2020 pic.twitter.com/rKa3WB7FRz

— Julio Mulero (@juliomulero) February 14, 2020

Happy Valentine’s Day! Thanks for this cute problem @mashupmath 😊#iteachmath #heartperimeter #heartarea #MTBoS pic.twitter.com/mMgxpXiF3W

— Regina Barrett ✨ (@Ms_MathQueen) February 14, 2020

No #mathdate today. Instead, in celebratration of #psiloveyouday 💜 , let’s recognize the power of love #iteachmath #mtbos pic.twitter.com/MfMuDtguoC

— James Carr (@jjc578) February 14, 2020

Molt interessant per a estudiants, entra en https://t.co/Kv5Nu6tTw0 i tens un nou Applet de Geogebra per a participar en l’Applet del mes de @SEMCV pic.twitter.com/oN7YUFqOTq

— SEMCV (@SEMCV) February 14, 2020

Happy Valentine’s Day!#valentine #love #heart #math pic.twitter.com/lsk4SX5HaW

— Mathigon (@MathigonOrg) February 14, 2020

Today’s #dailymaths problem from the Mathematics 2020 calendar in pic. Solution will post tomorrow. Daily problems with previous day’s solution are tweeted ~6am Eastern. Solutions by me and/or @MathsTim unless otherwise stated. Guest solution posts welcome–DM if interested. pic.twitter.com/udJA0rPAgl

— Great Women of Mathematics (@GWOMaths) February 14, 2020

Give your students some timely & relevant math tomorrow! 14 math tasks on Valentine’s Day, President’s Day & the NBA All Star Weekend https://t.co/IerOAxyGyA #iteachmath #mtbos #msmath #elemmath pic.twitter.com/PamfncVcG5

— Brian Marks (@Yummymath) February 13, 2020

#HappyValentines Send a rotated cardioid curve to someone you love ❤️ pic.twitter.com/ihDM0h8ljp

— UCL Department of Mathematics (@MathematicsUCL) February 14, 2020

Oh my gosh you all! Thanks for all the likes, follows, retweets, and for spreading the math love! You blew up my Twitter and made me smile all night. Here is a link in case you didn’t see! #teach180 #iteachmath https://t.co/FdIGc00O4D

— Cassandra Valenti (@MathWithMrsV) February 14, 2020

Happy Valentine’s Day! #mtbos #iteachmath https://t.co/m1LC6dGaho

— Math912Teacher (@Math912Teacher) February 14, 2020

Who'd have thought there were so many ways to say it, in the language of Maths?! https://t.co/AZaSj2wMN3

— CamsMaths (@CamsMaths) February 14, 2020

❤️🧮❤️📐❤️📏❤️✏️❤️

For those maths teachers lucky enough to be working today, did you know that @aap03102’s Valentine’s Day Maths Relay is available as a OneNote Escape Room? 🔐
Link here: https://t.co/hSTDkNCbtK pic.twitter.com/GpnfN2SLbh

— Mr Allan (@mrallanmaths) February 14, 2020

Happy Valentine's Day 😁😁❤ #valentinesday pic.twitter.com/g1ljxnLHvX

— Matematickcom (@Matematickcom) February 14, 2020

❤️🧮❤️📐❤️📏❤️✏️❤️

For those maths teachers lucky enough to be working today, did you know that @aap03102’s Valentine’s Day Maths Relay is available as a OneNote Escape Room? 🔐
Link here: https://t.co/hSTDkNCbtK pic.twitter.com/GpnfN2SLbh

— Mr Allan (@mrallanmaths) February 14, 2020

Thanks to math you can play with a heart without anyone getting hurt 😉 Check out this cool interactive geometry! #ValentinesDay #STEAM https://t.co/JYhOOHtNQZ

— Bedtime Math (@BedtimeMath) February 14, 2020

48 and 75 are ‘betrothed’ numbers, because the positive nontrivial divisors of 48 (2, 3, 4, 6, 8, 12, 16, 24) sum to 75, and the positive nontrivial divisors of 75 (3, 5, 15, 25) sum to 48. https://t.co/Zfq2ckHWWV #ValentineMaths pic.twitter.com/qMoevWZBhj

— Maths Ed (@MathsEdIdeas) February 13, 2020

Here's a valentines day puzzle. Can you figure out what it says?

i²i³ (x² + y² – 1)³ – x²y³ = 0 ∫ 1 du#MTBoS

— David Wees (@davidwees) February 14, 2020

#valentines from my favourite year 10s! pic.twitter.com/08cBf2pJDz

— stephenbodman (@stephenbodman) February 14, 2020

#HaceNueveAños ¡Feliz día de San Valentín matemático!
¡Con la banda de Möbius!https://t.co/tQUQhI4i94 pic.twitter.com/Yai2s7dLJc

— Marta Macho Stadler (@MartaMachoS) February 14, 2020

My kindergartener made this for the 100th day of school, out of 100 perler beads. I thought it would be a real challenge but she naturally figured out how to make an almost-symmetrical design. We had some good talks about odd and even as a result. #tmwyk @_jmnoonan pic.twitter.com/zmwWxIS21y

— Heidi Fessenden 🌎 (@heidifessenden) February 13, 2020

"A unique valentine's card that uses binary to tell the recipient that they are your number 1 person." A secret message in 1s and 0s. Source: https://t.co/VmbIqzWzGg pic.twitter.com/P5PeCigzTZ

— Cliff Pickover (@pickover) February 14, 2020

Some infinitely adorable #ValentinesDay math from @elclimo 😀#mathjokes pic.twitter.com/04u0f3pD4G

— Bedtime Math (@BedtimeMath) February 14, 2020

I hope those tweets help fuel your love for mathematics. Have a very happy Valentines’ Day!

1453 Happy Birthday, Jo Morgan

2020-01-062020-02-13 / ivasallay / Leave a comment

Who Is Jo Morgan?

Jo Morgan is an inspiring mathematics teacher, collaborator, tweeter, blogger, podcast guest, and author. Today is her birthday!

Jo recently published her first book, A Compendium of Mathematical Methods, and it is all the rage on twitter. Here is a small sampling of tweets expressing excitement for her book:

Finished @mathsjem‘s Compendium. It’s brilliant! In the spirit of talking about methods, here’s a blog post with some words about the book, a couple of egs where I tend NOT to teach methods I’d use personally, and a method that’s not in the book.https://t.co/axjXWtcCF7 pic.twitter.com/ZPtZretJD4

— Sudeep (@boss_maths) December 27, 2019

Great minds think alike! @mathsjem helping us both have a Merry Christmaths! Thank you @Mathsteach75 ❤️🎁 pic.twitter.com/cTQufWxqOM

— Gemma Heald (@GemmaHeald) December 25, 2019

I have my hands on it! My copy of A Compendium of Mathematic Methods by @mathsjem has arrived. Book 1 of the festive period 🎅 pic.twitter.com/6rcwZisNrb

— Ms Olsen-Dry (@Ms_VOD) December 21, 2019

Time over the holidays for a good read about maths? We’ve got some suggestions from 2019 publications https://t.co/Ftu9msIBJ2 pic.twitter.com/HGnauHSoem

— The NCETM (@NCETM) December 30, 2019

I can hardly wait until February 4th when Amazon makes it available in the United States!

Jo has enjoyed solving some of my puzzles, so to commemorate her birthday, I’ve made one especially for her. To solve this puzzle, write the numbers 1 to 10 in each of the four sections outlined in bold so that those numbers are the factors of the product clues given in each of the four mixed-up multiplication tables that make up the puzzle. Use logic to solve the puzzle, but I’m warning you, it won’t be easy.

Happy birthday, Jo! I hope you enjoy the puzzle!

Find the Factors 1 – 10 Birthday Challenge Puzzle:

Print the puzzles or type the solution in this excel file: 12 Factors 1443-1453

Factors of 1453:

It is convenient for puzzles to be numbered, and this puzzle number is 1453. Here are a few facts about that number:

1453 is a prime number.
Prime factorization: 1453 is prime.
1453 has no exponents greater than 1 in its prime factorization, so √1453 cannot be simplified.
The exponent in the prime factorization is 1. Adding one to that exponent we get (1 + 1) = 2. Therefore 1453 has exactly 2 factors.
The factors of 1453 are outlined with their factor pair partners in the graphic below.

How do we know that 1453 is a prime number? If 1453 were not a prime number, then it would be divisible by at least one prime number less than or equal to √1453. Since 1453 cannot be divided evenly by 2, 3, 5, 7, 11, 13, 17, 19, 23, 29 31, or 37, we know that 1453 is a prime number.

Other Facts about the Number 1453:

1453 is the sum of two squares:
38² + 3² = 1453

That means 1453 is the hypotenuse of a Pythagorean triple:
228-1435-1453 calculated from 2(38)(3), 38² – 3², 38² + 3².

Here’s another way we know that 1453 is a prime number: Since its last two digits divided by 4 leave a remainder of 1, and 38² + 3² = 1453 with 38 and 3 having no common prime factors, 1453 will be prime unless it is divisible by a prime number Pythagorean triple hypotenuse less than or equal to √1453. Since 1453 is not divisible by 5, 13, 17, 29, or 37, we know that 1453 is a prime number.

Countdown to 2020

2019-12-302020-01-24 / ivasallay / Leave a comment

Countdown to 2020:

It seems that every New Year’s Eve, mathematicians come up with equations with the new year in it. Some of those equations will be a countdown. Here is the equation that I found and made into a gif:

make science GIFs like this at MakeaGif

Factors of 2020:

What will the factors be in the year 2020? I’m here ready with my predictions and the reasons that you can rely on them:

2020 is a composite number.
Prime factorization: 2020 = 2 × 2 × 5 × 101, which can be written 2020 = 2² × 5 × 101
2020 has at least one exponent greater than 1 in its prime factorization so √2020 can be simplified. Taking the factor pair from the factor pair table below with the largest square number factor, we get √2020 = (√4)(√505) = 2√505
The exponents in the prime factorization are 2, 1, and 1. Adding one to each exponent and multiplying we get (2 + 1)(1 + 1)(1 + 1) = 3 × 2 × 2 = 12. Therefore 2020 has exactly 12 factors.
The factors of 2020 are outlined with their factor pair partners in the graphic below.

A 2020 Factor Tree and a 2020 Factor Cake:

A 2020 factor tree may interest you:

Or a 2020 Factor Cake:

Other Facts about the number 2020:

2020 is palindrome 4C4 in BASE 21 (C is 12 in base 10):
4(21²) + 12(21) + 4(1) = 4(441) + 12(21) + 4 = 1764 + 252 + 4 = 2020

42² + 16² = 2020
38² + 24² = 2020

2020 is the hypotenuse of FOUR Pythagorean triples:
400-1980-2020 which is 20 times (20-99-101)
868-1824-2020 calculated from 38² – 24², 2(38)(24), 38² + 24²
1212-1616-2020 which is (3-4-5) times 404
1344-1508-2020 calculated from 2(42)(16), 42² – 16², 42² + 16²

2020 is the difference of two squares two different ways:
506² – 504² = 2020
106² – 96² = 2020
Can you calculate when 2020 is a leg in a Pythagorean triple from those equations? (The Pythagorean triples can be calculated from a² – b², 2(a)(b), a² + b²)

Then can you calculate other times 2020 is a leg in a Pythagorean triple from these facts? (The Pythagorean triples can be calculated from 2(a)(b), a² – b², a² + b²)
2(1010)(1) = 2020
2(505)(2) = 2020
2(202)(5) = 2020
2(101)(10) = 2020
Did any of those equations produce the same Pythagorean triples that the difference of two squares produced?

2020 is the sum of four squares in MANY different ways. Here is how I found two of those ways:

Twitter Posts I’ve Seen about the Number 2020:

2020 is an autobiographical number, because in the base of the number of its digits (4) it describes itself: It has 2 zeroes, 0 ones, 2 twos and 0 threes. The largest and only decimal autobiographical number is 6,210,001,000 • https://t.co/fOBeHMzi4u #maths #math #HappyNewYear pic.twitter.com/QMfAzMgqku

— Maths Ed (@MathsEdIdeas) December 27, 2019

=(4)(5){4(25)+1}
=20 (100+1)
=20(101)
= 2020

— Ziyanda Soya👜👠❤🗡🥊➕️ (@LadyZee50165267) December 27, 2019

pic.twitter.com/aDD666dMtr

— Karen Gholam Tabbal (@karengholam) December 28, 2019

2020 is the smallest number that can be written as the sum of the squares of four consecutive primes and as the sum of two squares in two ways #HappyNewYear #HappyNewYear2020 #maths #math

2020 = 17²+19²+23²+29²
2020 = 16²+42²
2020 = 24²+38²

— Maths Ed (@MathsEdIdeas) December 29, 2019

مجموع مربعات 4 أعداد أولية متتالية 2020
17²+19²+23²+29²
عام 2020 سعيد pic.twitter.com/9AQ89cTt4k

— الخوارزمي الصغير (@bergasmath) December 29, 2019

Day 364: #mathiratti pic.twitter.com/3uxeDS6PFK

— Diego Rattaggi 🇨🇭 (@diegorattaggi) December 30, 2019

Let’s Make a Factor Cake for 2020 https://t.co/NNlSeGW4hZ pic.twitter.com/GnVZy2o0fN

— Iva Sallay (@findthefactors) December 30, 2019

Math up your countdown to 2020… #HappyNewYear #HappyNewYear2020 #maths #math pic.twitter.com/wLnxBBZiVo

— Maths Ed (@MathsEdIdeas) December 30, 2019

It’s official: 10 x 9 x 8 + (7 + 6) x 5 x 4 x (3 + 2) x 1 = 2020 is this NYE’s most elegant countdown equation.https://t.co/I575FHKNJ6

— Alex Bellos (@alexbellos) December 30, 2019

So I looked up the official decade start.
There isn’t one. Math heads will say there was no year zero, so it starts Jan 1 2021. Sentimental people will say it starts Jan 1 2020.
By definition a decade can start any year, depending on what year one begins to measure.
So go ahead

— BKinD (@BKinDetroit) December 30, 2019

Does your New Year Resolution List for 2020 look anything like this?

If so, send me a wee email (aap03102@gmail.com) and I might (!) be able to help….#MathsNewsletter #AlsoContainsTheMilkRota pic.twitter.com/YZnObCcbBI

— Chris Smith (@aap03102) December 30, 2019

At 20 seconds past 20:20 on this New Year’s Eve, we will be exactly 20 days away from it being 20 seconds past 20:20 on the 20th day of the year 2020 #Day202020 #HappyNewYear #HappyNewYear2020 pic.twitter.com/8XEqzdQOoF

— Maths Ed (@MathsEdIdeas) December 31, 2019

12 hours left on this one 🙂 https://t.co/wzviR7rsjz

— M Shah (@shahlock) December 31, 2019

Celebrate the year 2020. What can we say about 2020? Here are the divisors of 2020. pic.twitter.com/GaTSbsYhZR

— Cliff Pickover (@pickover) December 30, 2019

2020 =(ddddd −d)/dd × (d+d)/d

d∈(1,2,3,4,5,6,7,8,9)

— . (@Expert_Says) December 31, 2019

2020=(123+4)×(5+6)+7×89

2020=98+7+65+43^2+1.

— . (@Expert_Says) December 31, 2019

2020
＝16²+42²
＝24²+38²
＝18²+20²+36²
＝17²+19²+23²+29²
(連続する4つの素数の平方和)

— ブリッジ@京大院 YouTubeで問題解説&教育情報 (@BridgeKyotouniv) December 30, 2019

2020=17²+19²+23²+29²#HappyNewYear2020 🎇#MathGIF w/ @geogebra pic.twitter.com/8wfOhfaErA

— Vincent Pantal🍩ni (@panlepan) December 31, 2019

Every day is a good day for Maths, but here’s a calendar I drew up of some extra fun Maths dates for 2020 🥳

Can’t wait for Pythagorean Triple Day 📐

What other cool dates have I missed? pic.twitter.com/snGb2McLGF

— Ayliean (@Ayliean) December 31, 2019

Wishing you a wonderful 2020🎉:

2020 = 402+403+404+405+406
2020 = 249+250+…+255+256
2020 = 31+32+33+…+70
2020 = 24² + 38²
2020 = 16² + 42²
2020 = 4² + 6² + 8² +…+ 22²
2020 = t₃ + t₄ + t₅ + … + t₂₂
(△ numbers)#happynewyear2020 pic.twitter.com/CMPOrwJfjm

— Ed Southall (@solvemymaths) December 31, 2019

Happy New Year! Here’s some 2020 math. Start the countdown! #happynewyear2020

10*(9+8*7*6-5!-4!+3-2*1) = 2020

(10*9+8!/(7*6)-5*4!/3)*2*1 = 2020

10*(9+8)*7+6!+5!-4*3+2*1 = 2020

(10+9)*(8+7+6)*5+4!+3-2*1 = 2020

(10-9*8+7-6+5+4^(3!))/2*1 = 2020

10*(9+8*7-6+5!+4!)-3^2-1 = 2020

— Derek (the Halls) Orr (@Derektionary) December 31, 2019

How many ways can you get 2020 using 10 9 8 7 6 5 4 3 2 1 in that order?

— Ed Southall (@solvemymaths) December 31, 2019

🇪🇸¡Feliz año nuevo x a todos!🇬🇧 Happy New Year x to everyone!
x = 10 × 9 × 8 + 7 + 6 × 5 × 43 + 2 + 1

— Ignacio Larrosa Cañestro (@ilarrosac) December 31, 2019

Una descomposición atractiva para 2020: los cubos de los cinco primeros números pares acompañados de los cuadrados correspondientes:

2020=2^3+2^2+4^3+4^2+6^3+6^2+8^3+8^2+10^3+10^2

— Antonio Roldán (@Connumeros) December 31, 2019

Here’s a special countdown for 2020. Happy New Year! pic.twitter.com/mxjD0evMDJ

— Fermat’s Library (@fermatslibrary) December 31, 2019

¡Feliz 2020!
En este año autobiográfico, escribid vuestra propia biografía, y no dejéis que los demás lo hagan por vosotros.
¡Feliz año nuevo!#AnoNuevo2020 #felizNochevieja #Feliz2020 #FelizAnoNuevo pic.twitter.com/YoWujsXtQs

— MatematicasCercanas (@matescercanas) December 31, 2019

pic.twitter.com/ESxQCfUNzC

— matematik (@il1123) December 31, 2019

2020 is the hypotenuse of four Pythagorean triple triangles: 400-1980-2020 which is 20 times (20-99-101)
868-1824-2020 calculated from 38² – 24², 2(38)(24), 38² + 24²
1212-1616-2020 which is (3-4-5) times 404
1344-1508-2020 calculated from 2(42)(16), 42² – 16², 42² + 16² pic.twitter.com/4PJ2togatt

— Iva Sallay (@findthefactors) December 31, 2019

Shiver in ecstasy. The year “2020” can be created using only the 9 digit. https://t.co/FHtffsaSFP pic.twitter.com/4SKrACQps0

— Cliff Pickover (@pickover) December 31, 2019

pic.twitter.com/fs0pQpjHSa

— Mrityunjoy Hazra (@3Mrityunjoy) December 31, 2019

#mathematics #mathteacher #teachmath #happynewyear2020

Answer(with surprise End): https://t.co/Aai4pg9moG pic.twitter.com/koLGfih57B

— Matematik_Man (@matematik_man) December 31, 2019

no primes or semi-primes for a whole year since every date will be divisible by 2x2x5 :/// https://t.co/WRf0U77FRx

— .json derulohoho 🎄 (@bathwater4jess) December 31, 2019

Happy New Year to all you educators who care about ‘ the kids’. #MTBoS #iteachmath #mathchat pic.twitter.com/JQdi4rcsi6

— Don Fraser (@DonFraser9) December 31, 2019

今年見つけた数式の、僕が好きなやつたちです pic.twitter.com/8lFGw1kfir

— 湧水(ゆうすい) (@Fujino_Yuusui) December 31, 2019

¡¡Feliz 2020!! pic.twitter.com/0fWPfIvUVS

— M. Ángeles Gil (@magilbla) December 31, 2019

I 💖 the 2020 GIF @solvemymaths made. The big finish is that 2020 is the sum of triangular numbers 😮. Good reminder. The sum of consecutive triangular numbers is a square 🟪. #iteachmath #HappyNewYear everybody. pic.twitter.com/DaVvLKv71u

— Jim Olsen (@DrOlsen314) December 31, 2019

2020 = [22 × 2 + (2⁰ ÷ (2⁰ + (2⁰ ÷ (2 × 2 × 2 × 2 + (2⁰ ÷ (2⁰ + (2⁰ ÷ (22 × 2 × 2 + (2⁰ ÷ (2⁰ + (2⁰ ÷ (2 × 2 × 2 × 2 + (2⁰ ÷ (2⁰ + (2⁰ ÷ (22 × 2 × 2 + (2⁰ ÷ … ]² #HappyNewYear #HappyNewYear2020 #maths #math pic.twitter.com/EF0w4LEM6G

— Maths Ed (@MathsEdIdeas) December 31, 2019

Finding 2020 in different bases. Which one doesn’t belong? pic.twitter.com/BDnDDbdKi1

— Iva Sallay (@findthefactors) December 31, 2019

Happy New Year! 🎆 pic.twitter.com/GwNMdwJf6y

— Ordinaryüs ∲ (@Caner_KMZ) December 31, 2019

Happy New Year 2²×5×101 🎆🎇🥂🎉 pic.twitter.com/5BYnk6ptX9

— Mathigon (@MathigonOrg) December 31, 2019

2020 es la suma de los cuadrados de cuatro números primos consecutivos: pic.twitter.com/9ZRQS0Pr3y

— fun with functions (@funfunfunctions) December 31, 2019

Veo publicados en las últimas horas muchos descensos de cifras para el 2020, así que me ha entrado el deseo de volver a compartir mi ascenso-descenso:

2020=(12+3+4)×(5!+6+7+8)-9-8×76-5-4-32-1

— Antonio Roldán (@Connumeros) December 31, 2019

Happy New Year. The year “2020” can be written like this, in binary. (Orange = 1; cyan = 0) pic.twitter.com/gashhAXLAz

— Cliff Pickover (@pickover) December 31, 2019

会員の皆さん。

今年も大変お世話になりました。
来年もどうぞ宜しくお願いします🤲

好きな演算を用いて等式を完成させてください🎍 pic.twitter.com/Mis80KBwol

— 数学を愛する会 (@mathlava) December 31, 2019

Here’s a start 👍 https://t.co/elNqy1W7mj

— Ed Southall (@solvemymaths) December 31, 2019

This short work by Inder J. Taneja brings representations of 2020 in different situations. This is a special countdown for 2020. Happy New Year! [full paper: https://t.co/KhDmoEb7Sw] pic.twitter.com/FZncYrqc5K

— Massimo (@Rainmaker1973) December 31, 2019

Tras un año de emociones intensas, ojalá lo despidamos como es debido y recibamos un nuevo año cargado de salud e ilusiones nuevas. Se os quiere 😍 pic.twitter.com/O5m5OczNfc

— Julio Mulero (@juliomulero) December 31, 2019

Happy new year for all with @geogebra https://t.co/ZvlTKUzkOz #geogebra #MTBoS #ITeachMath #math #maths #EdTech #geometry #MathEd #FigureThat @mathieublossier
@bancoche @PerHenrikChris1 pic.twitter.com/ybUDQCMNBu

— Daniel Mentrard (@dment37) December 31, 2019

@Mathematical_A @tweetprofmatt @nick_battle_uk
This is nice – it’s got the numbers from 1 to 10 involved – and in order too!
(And because everything is commutative, it works in ascending order as well.) https://t.co/8WHpycshGP

— Mark Dawes (@mdawesmdawes) December 31, 2019

Una descomposición atractiva para 2020: los cubos de los cinco primeros números pares acompañados de los cuadrados correspondientes:

2020=2^3+2^2+4^3+4^2+6^3+6^2+8^3+8^2+10^3+10^2

— Antonio Roldán (@Connumeros) December 31, 2019

2020 con solo cinco factoriales:

2020=3!×8!/5!+2!+2!

— Antonio Roldán (@Connumeros) December 31, 2019

También vuelvo a compartir un ascenso del 1 al 9 para el nuevo año:

2020=(1+234+56)×7-8-9

— Antonio Roldán (@Connumeros) December 31, 2019

A todos mis amigos de Twitter, amantes de las matemáticas, les deseo un próspero, fructífero y feliz año nuevo: pic.twitter.com/nnX8Bgn64o

— Ignacio Mantilla Prada (@MantillaIgnacio) December 31, 2019

Una felicitación demostrada Pitagórica de @AMRamosDelOlmo para el 2020.#ChristMaths https://t.co/Ow9f07i52O

— Juan Miguel Ribera (@juanripu) December 31, 2019

Feliz 2020 #QueseadeHuelva pic.twitter.com/SYgozKWEtO

— Luis M. Iglesias (@luismiglesias) January 1, 2020

Happy New Year!
The 2020th decimal place of 𝛑 is 3.
The 2020th decimal place of ℯ is 3.
The 2020th decimal place of φ is 3.

All three of these constants are believed to be ’normal’. How often do you expect their digits to coincide like this?

— Math In The News (@MathInTheNews) January 1, 2020

That’s how I count it: the 1st year of a decade ends in 1. But other more impatient folk consider we’re there already. We had the same problem with 1999 & 2000. Folk found it hard to accept that 2000 was the last year of the same century as 1999: the 20th (!) Century. Go figure. https://t.co/pf2GzQc3Ij

— Chris Maslanka (@ChrisMaslanka) January 1, 2020

Primera hora π del año

2020=(3+1)(4+1)(5+92+6)-(5+3)×5#πLife

Expresión vía @Connumeros pic.twitter.com/1PE8JDMQfb

— Juan Miguel Ribera (@juanripu) January 1, 2020

Last blog for 2019! Here are twenty #math puzzles to kick off 2020. Difficulty and subject topics vary. I’ve got counting, arithmetic, #algebra, probability, geometry, #statistics, and a little evil number theory. Enjoy and Happy New Year!https://t.co/h4cliBgyuU #mtbos

— M Shah (@shahlock) January 1, 2020

How mathematicians count down to 2020. https://t.co/55Ek9ZK0ae pic.twitter.com/4PyOb3GWGn

— Cliff Pickover (@pickover) January 1, 2020

#CMProblemOfTheDay

2020 can be written as MMXX … What is the next year that can be written as two different Roman Numerals.

What would be a useful starting point? https://t.co/cO7P4k7Ydb…

Download on our FREE resources page#ShowYourWorkingOut ✍️ pic.twitter.com/yb4VMqinSx

— Complete Maths (@LaSalleEd) December 31, 2019

Happy 2020 pic.twitter.com/DeiRECIOSK

— . (@Expert_Says) January 1, 2020

pic.twitter.com/MVHIXpPmWZ

— Dan McQuillan (@normalsubgroup) January 1, 2020

Happy New Year!
2020 is the sum of the squares of four consecutive prime numbers. Can you find them?

— Math In The News (@MathInTheNews) December 31, 2019

2020 Mathematics Game — Join the Fun! https://t.co/xYLt3bEPP2

— Math 4 Everybody (@Math4Everybody) January 1, 2020

あってるはず…… pic.twitter.com/cox3UczSeX

— Kei (@Kei21104367) December 31, 2019

pic.twitter.com/BXbAXrTIAt

— raer (@Jukenkiero) December 31, 2019

pic.twitter.com/Bu3fYIhReu

— マカロニサラダ (@yosuke8vc) December 31, 2019

pic.twitter.com/sLTsdsxLt8

— 神崎月桂／文詠(あやよみ)@嘘創夢想　82569/180000 (@kanzaki_narou) December 31, 2019

pic.twitter.com/PfV4jcRC6G

— ショショの奇妙な妄言 (@OgunosuShopan) December 31, 2019

2020年01月01日令和02年にちなんで

今年もよろしくお願いします👐 pic.twitter.com/MQ4bTWnwoP

— たっつぁん (@Wz7rNf) December 31, 2019

pic.twitter.com/URGZszy4e0

— U (@u15559) December 31, 2019

やっとできた… pic.twitter.com/RywJ8TyyyL

— たくれ (@tackrei_) December 31, 2019

pic.twitter.com/I2wrtnDjo8

— こ (@kinsei0916) December 31, 2019

Me han enviado una felicitación de año nuevo cualquier cifra

(1111-111+11-1)x(1+1) =
2222-222+22-2 =
3x((3!)!-33)-33-3×3+3:3 =
4^4x(4+4)-44+4×4 =
5^5-555-555+5 =
((666+6+6:6)x(6+6+6)+6):6 =
(7×7-7-7:7)x7x7+7+7-(7+7+7):7 =
88x(8+8+8)-88-8×8:(8+8) =
999+999+9+9+(9+9+9+9):9 =
2020 https://t.co/BEJDf948qs

— Juan Miguel Ribera (@juanripu) January 1, 2020

No habrá otro año con cuatro cifras escrito en números romanos hasta el 2040 #ChristMaths #MathLife https://t.co/RsJ35xdc8v

— Juan Miguel Ribera (@juanripu) January 1, 2020

pic.twitter.com/udk75Qvtki

— マカロニサラダ (@yosuke8vc) December 31, 2019

2020 written as a palindromic, ambigrammatic, strobogrammatic, vertically and horizontally symmetric, ʇuoɹɟ oʇ ʞɔɐq puɐ spɹɐʍʞɔɐq uʍop ǝpᴉsd∩ expression. #HappyNewYear #HappyNewYear2020 #maths #math pic.twitter.com/ryXulOMb60

— Maths Ed (@MathsEdIdeas) January 1, 2020

Because the ratio proportion between the sides of the blue triangles is 1:2, the crossing line is a height of the big triangle, so the baricenter.
Then the rectangle ratio is 1:4 & the side is 4•505=2020 😄 pic.twitter.com/44ngSFPFRg

— Guillem Bonet (@willhek1) December 31, 2019

2020 a partir de los 9 primeros números naturales https://t.co/OIFj4iRP9F vía @matescercanas

— emilio lindosa lucas (@411emilio) January 2, 2020

2020 In Numbers – Mathematical Style https://t.co/QKWV1pGUaV pic.twitter.com/IQdvDYHB7w

— INDER J. TANEJA (@IJTANEJA) January 2, 2020

02/02/2020 is the first date to be palindromic across formats (since 11/11/1111). It is the 67th of 335 palindromic ddmmyyyy dates between 10/01/1001 and 29/09/9092, and the 47th of 331 palindromic mmddyyyy dates between 10/01/1001 and 09/29/9290. #HappyNewYear2020 #maths #math pic.twitter.com/5LfMpiR8qJ

— Maths Ed (@MathsEdIdeas) January 3, 2020

2020 In Numbers: Mathematical Style https://t.co/HgV8ipdO35 pic.twitter.com/AeafvSODqv

— INDER J. TANEJA (@IJTANEJA) January 2, 2020

Seguimos con algunas curiosidades sobre el 2020, el año que hemos comenzado. En este caso os traigo ocho ternas pitagóricas de las que forma parte el 2020.https://t.co/w6yPtDSvzN #Bienvenido2020 #Hola2020 #FelizViernesATodos pic.twitter.com/Sen2Qy9aFG

— MatematicasCercanas (@matescercanas) January 3, 2020

Happy New Year! How many pairs of positive integers a and b fit this equation? #maths #puzzle pic.twitter.com/dsbY1tP7oJ

— Puzzle Critic (@puzzlecritic) January 5, 2020

pic.twitter.com/BdxoMvME12

— vivekanand mandal (@vivekanandman16) January 5, 2020

Gave the following challenge to #rdcrs students…
Using each number 1 – 10 exactly once, determine an equation that equals 2020.

Here is what 2 students from @STFWolves came up with..
and other examples as well#mathchat #MTBoS pic.twitter.com/HDRlxjzA0P

— 𝘋𝘢𝘷𝘦 𝘔𝘢𝘳𝘵𝘪𝘯 (@d_martin05) January 7, 2020

Heart: Mathematics Lovers – Magic Squares of Order 4 of Equal Magic Sums https://t.co/AHhYfZOQwb pic.twitter.com/04AfM5BgfB

— INDER J. TANEJA (@IJTANEJA) January 8, 2020

Shiver in ecstasy. We live in a year that is the sum of the squares of four consecutive prime numbers. pic.twitter.com/R4o3gMZieH

— Cliff Pickover (@pickover) January 14, 2020

Is there any other way to write 2020 as a difference of two squares?

Note: We are looking for a difference of squares of positive integers. Squares of negative numbers and non-integers don’t count! pic.twitter.com/Jbr2UhWSb3

— Brilliant.org (@brilliantorg) January 18, 2020

That’s a lot of love for the number 2020. Have a wonderful year, everybody!

Let’s Make a Factor Cake for 2020

2019-12-302019-12-31 / ivasallay / Leave a comment

We often celebrate special occasions with a cake!

Coincidentally, there is a method to find the prime factorization of a number that is called the cake method.

Let’s make a factor cake for the year 2020 to celebrate its arrival!

make science GIFs like this at MakeaGif

The factor cake shows that the prime factorization of 2020 is 2 × 2 × 5 × 101. We can write that more compactly: 2020 = 2² × 5 × 101.

In case you would like a still picture of the cake instead of the gif, here it is:

I will write more about the number 2020 before tomorrow. Enjoy saying good-bye to 2019 and getting ready for the new year!

1452 Poinsettia Plant Mystery

2019-12-23 / ivasallay / Leave a comment

Merry Christmas, Everybody!

The poinsettia plant has a reputation for being poisonous, but it has never been a part of a whodunnit, and it never will. Poinsettias actually aren’t poisonous.

Multiplication tables might also have a reputation for being deadly, but they aren’t either, except maybe this one. Can you use logic to solve this puzzle without it killing you?

To solve the puzzle, you will need some multiplication facts that you probably DON’T have memorized. They can be found in the table below. Be careful! The more often a clue appears, the more trouble it can be:

Notice that the number 60 appears EIGHT times in that table. Lucky for you, it doesn’t appear even once in today’s puzzle!

Now I’d like to factor the puzzle number, 1452. Here are a few facts about that number:

1 + 4 + 5 + 2 = 12, which is divisible by 3, so 1452 is divisible by 3.
1 – 4 + 5 – 2 = 0, which is divisible by 11, so 1452 is divisible by 11.

1452 is a composite number.
Prime factorization: 1452 = 2 × 2 × 3 × 11 × 11, which can be written 1452 = 2² × 3 × 11²
1452 has at least one exponent greater than 1 in its prime factorization so √1452 can be simplified. Taking the factor pair from the factor pair table below with the largest square number factor, we get √1452 = (√484)(√3) = 22√3
The exponents in the prime factorization are 2, 1, and 2. Adding one to each exponent and multiplying we get (2 + 1)(1 + 1)(2 + 1) = 3 × 2 × 3 = 18. Therefore 1452 has exactly 18 factors.
The factors of 1452 are outlined with their factor pair partners in the graphic below.

To commemorate the season, here’s a factor tree for 1452:

Have a very happy holiday!

1451 Star of Wonder

2019-12-182019-12-19 / ivasallay / Leave a comment

An important part of Mathematics is noticing patterns. I love it when mathematicians ask students, “What do you notice? What do you wonder?”

Those are questions you can ponder as you gaze on this star of wonder made from several different graphs.

To help distinguish the graphs, the dotted lines are exponential functions, the dashed lines are natural logarithm functions, and the solid lines are linear functions.

What do you notice? What do you wonder?

Now I’ll tell you a little bit about the post number, 1451:

1451 is a prime number.
Prime factorization: 1451 is prime.
1451 has no exponents greater than 1 in its prime factorization, so √1451 cannot be simplified.
The exponent in the prime factorization is 1. Adding one to that exponent we get (1 + 1) = 2. Therefore 1451 has exactly 2 factors.
The factors of 1451 are outlined with their factor pair partners in the graphic below.

How do we know that 1451 is a prime number? If 1451 were not a prime number, then it would be divisible by at least one prime number less than or equal to √1451. Since 1451 cannot be divided evenly by 2, 3, 5, 7, 11, 13, 17, 19, 23, 29 31, or 37, we know that 1451 is a prime number.

1450 A Pair of Factor Trees

2019-12-162019-12-16 / ivasallay / Leave a comment

On today’s puzzle, there are two small Christmas trees. Will two smaller trees on the puzzle be easier to solve than one big one? You’ll have to try it to know!

Every puzzle has a puzzle number to distinguish it from the others. Here are some facts about this puzzle number, 1450:

1450 is a composite number.
Prime factorization: 1450 = 2 × 5 × 5 × 29, which can be written 1450 = 2 × 5² × 29
1450 has at least one exponent greater than 1 in its prime factorization so √1450 can be simplified. Taking the factor pair from the factor pair table below with the largest square number factor, we get √1450 = (√25)(√58) = 5√58
The exponents in the prime factorization are 1, 2, and 1. Adding one to each exponent and multiplying we get (1 + 1)(2 + 1)(1 + 1) = 2 × 3 × 2 = 12. Therefore 1450 has exactly 12 factors.
The factors of 1450 are outlined with their factor pair partners in the graphic below.

In case you are looking for factor trees for 1450, here are two different ones:

1450 is the hypotenuse of SEVEN Pythagorean triples:
170-1440-1450 which is 10 times (17-144-145)
240-1430-1450 which is 10 times (24-143-145)
406-1392-1450 which is (7-24-25) times 58
666-1288-1450 which is 2 times (333-644-725)
728-1254-1450 which is 2 times (364-627-725)
870-1160-1450 which is (3-4-5) times 290
1000-1050-1450 which is (20-21-29) times 50

1449 Christmas Star

2019-12-142019-12-15 / ivasallay / 3 Comments

If you’ve ever wished you knew the multiplication table better, then make that wish upon this Christmas star. If you use logic and don’t give up, then you can watch your wish come true!

I number the puzzles to distinguish them from one another. That star puzzle is way too big for a factor tree made with its puzzle number:

Here’s more about the number 1449:

Prime factorization: 1449 = 3 × 3 × 7 × 23, which can be written 1449 = 3² × 7 × 23
1449 has at least one exponent greater than 1 in its prime factorization so √1449 can be simplified. Taking the factor pair from the factor pair table below with the largest square number factor, we get √1449 = (√9)(√161) = 3√161
The exponents in the prime factorization are 2, 1, and 1. Adding one to each exponent and multiplying we get (2 + 1)(1 + 1)(1 + 1) = 3 × 2 × 2 = 12. Therefore 1449 has exactly 12 factors.
The factors of 1449 are outlined with their factor pair partners in the graphic below.

1449 is the difference of two squares in 6 different ways:
725² – 724² = 1449
243² – 240² = 1449
107²-100² = 1449
85² – 76² = 1449
45² – 24² = 1449
43² – 20² = 1449

1448 Christmas Factor Tree

2019-12-11 / ivasallay / Leave a comment

Here’s a puzzle that looks a little like a Christmas tree. Some of the clues might give you a little bit of trouble. For example, the common factor of 60 and 30 might be 5, 6, or 10. Likewise, the common factor of 8 and 4 might be 1, 2, or 4.

Which factor should you use? Look at all the other clues and use logic. Logic can help you write each of the numbers 1 to 12 in both the first column and the top row so that the given clues and those numbers behave like a multiplication table. Good luck!

I have to number every puzzle. It won’t help you solve the puzzle, but here are some facts about the number 1448:

The number made by its last two digits, 48, is divisible by 4, so 1448 is also divisible by 4. That fact can give us the first couple of branches of 1448’s factor tree:

1448 is a composite number.
Prime factorization: 1448 = 2 × 2 × 2 × 181, which can be written 1448 = 2³ × 181
1448 has at least one exponent greater than 1 in its prime factorization so √1448 can be simplified. Taking the factor pair from the factor pair table below with the largest square number factor, we get √1448 = (√4)(√362) = 2√362
The exponents in the prime factorization are 3 and 1. Adding one to each exponent and multiplying we get (3 + 1)(1 + 1) = 4 × 2 = 8. Therefore 1448 has exactly 8 factors.
The factors of 1448 are outlined with their factor pair partners in the graphic below.

1448 is also the hypotenuse of a Pythagorean triple:
152-1440-1448 which is 8 times (19-180-181)

1447 Christmas Light Puzzle

2019-12-09 / ivasallay / Leave a comment

If you’ve ever had a string of lights go out because ONE bulb went bad, it can be a very frustrating puzzle to figure out which light is causing the problem.

This is not that kind of puzzle. For this one, you just need to figure out where to put the numbers from 1 to 12 in both the first column and the top row so that the given clues are the products of those numbers. There is only one solution, and if you always use logic, it will not be a frustrating puzzle to solve.

I gave that puzzle the puzzle number 1447. That number won’t help you solve the puzzle, but here are some facts about it anyway:

1447 is a prime number.
Prime factorization: 1447 is prime.
1447 has no exponents greater than 1 in its prime factorization, so √1447 cannot be simplified.
The exponent in the prime factorization is 1. Adding one to that exponent we get (1 + 1) = 2. Therefore 1447 has exactly 2 factors.
The factors of 1447 are outlined with their factor pair partners in the graphic below.

How do we know that 1447 is a prime number? If 1447 were not a prime number, then it would be divisible by at least one prime number less than or equal to √1447. Since 1447 cannot be divided evenly by 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, or 37, we know that 1447 is a prime number.

1447 is also the difference of two consecutive squares:
724² – 723² = 1447

A Valentines Puzzle

Factors of 1454

Interesting Fact about the Number 1454:

Mathematical Valentine Tweets I’ve Seen Today:

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Who Is Jo Morgan?

Find the Factors 1 – 10 Birthday Challenge Puzzle:

Factors of 1453:

Other Facts about the Number 1453:

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Countdown to 2020:

Factors of 2020:

A 2020 Factor Tree and a 2020 Factor Cake:

Other Facts about the number 2020:

Twitter Posts I’ve Seen about the Number 2020:

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