A Bit About Betting

I got to thinking about the way that the odds of a horse winning are expressed in betting circles and I sought the help of Gemini 2.0 Flash Experimental to explain it. Here is what it came up with.

Question: If probability of an event happening is given as 2 to 1 on, what does that mean?

When someone says the probability of an event is "2 to 1 on," they're expressing odds in fractional form, specifically "odds on." This means the event is considered more likely to happen than not.   

Here's how to break it down:

2 to 1: This represents the ratio of the likelihood of the event happening versus it not happening. In this case, it means for every 2 times the event is expected to occur, it is expected not to occur 1 time.

"On": This indicates that the first number in the ratio (2 in this case) is larger than the second number (1). This signifies that the event is favored or has a greater than 50% chance of happening.

To convert "2 to 1 on" to a probability:

Add the two numbers in the ratio: 2 + 1 = 3

Divide the first number by the total: 2 / 3 = 0.666...

Therefore, "2 to 1 on" translates to approximately a 66.7% probability or two-thirds chance of the event happening.

Example:

If you're told the odds of a horse winning a race are "2 to 1 on," it implies that out of every three similar races, the horse is expected to win two and lose one.

Key takeaway: "Odds on" always indicate a greater than 50% chance of an event occurring, with the specific probability determined by the ratio provided.

I then asked the following question:

Question: What's an example of a bet that isn't odds on?

You're right to ask for clarification! It's important to understand the difference. A bet that isn't "odds on" means the event is considered less likely to happen than not. This is often referred to as "odds against."

Here's how it works:

The ratio: In "odds against," the second number in the ratio is larger than the first. For example, "3 to 1 against" or "5 to 2 against."

Meaning: This signifies that the event is less favored or has a less than 50% chance of happening.

Example:

Let's say the odds of a particular football team winning their next match are "3 to 1 against."

This means that for every 3 times the team is expected not to win, they are expected to win only 1 time.

To convert this to a probability:

Add the two numbers: 3 + 1 = 4

Divide the second number by the total: 1 / 4 = 0.25

So, "3 to 1 against" translates to a 25% probability of the team winning.

Another example:

If the odds of rolling a 6 on a standard six-sided die are "5 to 1 against," this means that for every 5 times you're expected not to roll a 6, you're expected to roll a 6 only once. This aligns with the actual probability of 1/6 (approximately 16.7%).

In summary:

Odds on: The first number in the ratio is larger (e.g., 2 to 1 on). Indicates a greater than 50% chance.

Odds against: The second number in the ratio is larger (e.g., 3 to 1 against).1 Indicates a less than 50% chance.   

Understanding this distinction is crucial for interpreting betting odds and evaluating the likelihood of different outcomes.

Gapful Numbers

 Numbers Aplenty has this to say about gapful numbers:

L. Colucci calls a number \(n\) of at least 3 digits a gapful number if \(n\)  is divisible by the number formed by the first and last digit of \(n\). For example, 583 is gapful because it is divisible by 53. About the 7.46% of the numbers are gapful.

The smallest Pythagorean triple made of gapful numbers is (120, 160, 200) and the first such primitive triple is (3159, 29440, 29609).

The concept can be extended to other bases. For example, the number 240 is gapful in all the bases from 2 to 10 and the number 54288 is gapful in all the bases from 2 to 16.

The first gapful numbers are 100, 105, 108, 110, 120, 121, 130, 132, 135, 140, 143, 150, 154, 160, 165, 170, 176, 180, 187, 190, 192, 195, 198, 200, 220, 225, 231, 240, 242, 253  

Figure 1 shows the representation of \(54288 = 2^4 \times 3^2 \times 13 \times 29\) in bases from 2 to 16:

Figure 1

Looking at the first and last digits in these different representations we see that:

• Base 2 --> 10 which is 2

• Base 3 --> 20 which is 6

• Base 4 --> 30 which is 12

• Base 5 --> 33 which is 18

• Base 6 --> 10 which is 6

• Base 7 --> 33 which is 24

• Base 8 --> 10 which is 8

• Base 9 --> 80 which is 72

• Base 10 --> 58 which is 58

• Base 11 --> 33 which is 36

• Base 12 --> 20 which is 24

• Base 13 --> 10 which is 13

• Base 14 --> 1a which is 24

• Base 15 --> 13 which is 18

• Base 16 --> d0 which is 13 x 16 = 208

All these numbers (2, 6, 8, 12 etc.) are divisors of 54288 and this why the number is so special.

One way to make these gapful numbers less numerous is to impose an additional criterion. For example, let's require that the sum of the number's digits is equal to the concatenation of the first and last digits. In the range between 1 and 40000, this reduces the numbers satisfying all criteria to 359. The numbers are (permalink):

190, 192, 195, 198, 1090, 1092, 1095, 1098, 1180, 1183, 1185, 1188, 1270, 1272, 1274, 1275, 1278, 1360, 1365, 1368, 1450, 1452, 1455, 1456, 1458, 1540, 1545, 1547, 1548, 1630, 1632, 1635, 1638, 1720, 1725, 1728, 1729, 1810, 1812, 1815, 1818, 1900, 1904, 1905, 1908, 2992, 2997, 10090, 10092, 10094, 10095, 10096, 10098, 10180, 10185, 10188, 10270, 10272, 10275, 10278, 10279, 10360, 10365, 10368, 10450, 10452, 10455, 10458, 10540, 10543, 10545, 10548, 10630, 10632, 10635, 10638, 10720, 10724, 10725, 10727, 10728, 10810, 10812, 10815, 10816, 10818, 10900, 10901, 10905, 10908, 11080, 11085, 11088, 11170, 11172, 11175, 11178, 11260, 11265, 11268, 11350, 11352, 11354, 11355, 11358, 11440, 11445, 11448, 11530, 11532, 11535, 11536, 11538, 11620, 11625, 11628, 11710, 11712, 11713, 11715, 11718, 11800, 11805, 11808, 12070, 12072, 12075, 12078, 12160, 12165, 12168, 12250, 12252, 12255, 12256, 12257, 12258, 12340, 12345, 12348, 12430, 12432, 12435, 12438, 12520, 12525, 12528, 12610, 12612, 12614, 12615, 12618, 12700, 12705, 12708, 13060, 13065, 13068, 13150, 13152, 13155, 13158, 13240, 13244, 13245, 13248, 13330, 13332, 13335, 13338, 13420, 13425, 13428, 13510, 13512, 13515, 13518, 13600, 13605, 13608, 14050, 14052, 14053, 14055, 14058, 14140, 14145, 14148, 14230, 14232, 14235, 14238, 14320, 14325, 14328, 14410, 14412, 14415, 14416, 14418, 14500, 14504, 14505, 14508, 15040, 15045, 15048, 15130, 15132, 15134, 15135, 15136, 15138, 15220, 15223, 15225, 15228, 15310, 15312, 15315, 15317, 15318, 15400, 15405, 15408, 15409, 16030, 16032, 16035, 16038, 16120, 16125, 16128, 16210, 16212, 16215, 16218, 16300, 16305, 16308, 17020, 17024, 17025, 17028, 17110, 17112, 17115, 17118, 17119, 17200, 17205, 17208, 18010, 18012, 18015, 18016, 18018, 18100, 18105, 18108, 19000, 19005, 19008, 21897, 21980, 21984, 22792, 22793, 22880, 22975, 22977, 23780, 23782, 23784, 23787, 23875, 23960, 23961, 23968, 24591, 24596, 24597, 24680, 24772, 24775, 24860, 24863, 24864, 24867, 25580, 25584, 25675, 25677, 25760, 25762, 25766, 25851, 25940, 25944, 25947, 26480, 26481, 26487, 26488, 26575, 26660, 26664, 26752, 26757, 26840, 26933, 26936, 27297, 27380, 27384, 27475, 27560, 27567, 27740, 27741, 27742, 27744, 27748, 27837, 27920, 27925, 28280, 28371, 28375, 28377, 28460, 28464, 28640, 28647, 28732, 28739, 28820, 28824, 28825, 28917, 29180, 29184, 29187, 29275, 29276, 29360, 29457, 29540, 29544, 29631, 29720, 29722, 29725, 29727, 29900, 29904, 39990, 39996, 39997

For example, 39997 has a first and last digit concatenation of 37 with a digit of 37 and a factoriation of 23 x 37 x 47. 

If instead, we require the product of the number's digit instead then only five numbers satisfy: 135, 11232, 12132, 12312, 13212 (permalink). For example, 13212 = 2^2 x 3^2 x 367 has a digit product of 12 which is a divisor of the number and 12 is also the concatenation of the first and last digits of the number.

Another criterion that could be applied is to require that the first and last digits be the same. In this case 227 numbers satisfy in the range up to 40000. They are (permalink):

121, 242, 363, 484, 1001, 1111, 1221, 1331, 1441, 1551, 1661, 1771, 1881, 1991, 2002, 2112, 2222, 2332, 2442, 2552, 2662, 2772, 2882, 2992, 3003, 3333, 3663, 3993, 4004, 4224, 4444, 4664, 4884, 5005, 5115, 5225, 5335, 5445, 5555, 5665, 5775, 5885, 5995, 6006, 6336, 6666, 6996, 7007, 7777, 8008, 8448, 8888, 9009, 9999, 10021, 10131, 10241, 10351, 10461, 10571, 10681, 10791, 10901, 11011, 11121, 11231, 11341, 11451, 11561, 11671, 11781, 11891, 12001, 12111, 12221, 12331, 12441, 12551, 12661, 12771, 12881, 12991, 13101, 13211, 13321, 13431, 13541, 13651, 13761, 13871, 13981, 14091, 14201, 14311, 14421, 14531, 14641, 14751, 14861, 14971, 15081, 15191, 15301, 15411, 15521, 15631, 15741, 15851, 15961, 16071, 16181, 16291, 16401, 16511, 16621, 16731, 16841, 16951, 17061, 17171, 17281, 17391, 17501, 17611, 17721, 17831, 17941, 18051, 18161, 18271, 18381, 18491, 18601, 18711, 18821, 18931, 19041, 19151, 19261, 19371, 19481, 19591, 19701, 19811, 19921, 20042, 20152, 20262, 20372, 20482, 20592, 20702, 20812, 20922, 21032, 21142, 21252, 21362, 21472, 21582, 21692, 21802, 21912, 22022, 22132, 22242, 22352, 22462, 22572, 22682, 22792, 22902, 23012, 23122, 23232, 23342, 23452, 23562, 23672, 23782, 23892, 24002, 24112, 24222, 24332, 24442, 24552, 24662, 24772, 24882, 24992, 25102, 25212, 25322, 25432, 25542, 25652, 25762, 25872, 25982, 26092, 26202, 26312, 26422, 26532, 26642, 26752, 26862, 26972, 27082, 27192, 27302, 27412, 27522, 27632, 27742, 27852, 27962, 28072, 28182, 28292, 28402, 28512, 28622, 28732, 28842, 28952, 29062, 29172, 29282, 29392, 29502, 29612, 29722, 29832, 29942, 30063, 30393, 30723, 31053, 31383, 31713, 32043, 32373, 32703, 33033, 33363, 33693, 34023, 34353, 34683, 35013, 35343, 35673, 36003, 36333, 36663, 36993, 37323, 37653, 37983, 38313, 38643, 38973, 39303, 39633, 39963

For example, 39963 = 3 x 7 x 11 x 173 has first and last digits the same and 33 divides the number.

Jordan-Polya Numbers

The number associated with my diurnal age today, 27648, is a Jordan-Polya number which Numbers Aplenty defines as a number that can be written as the product of factorial numbers. In the case of 27648 we have:$$\begin{align} 27648 &=2^{10} \times 3^3\\&=(4!)^3 \times 2! \end{align} $$There aren't that many of them in the range up to 40,000. Here are the initial numbers:

1, 2, 4, 6, 8, 12, 16, 24, 32, 36, 48, 64, 72, 96, 120, 128, 144, 192, 216, 240, 256, 288, 384, 432, 480, 512, 576, 720, 768, 864, 960, 1024, 1152, 1296, 1440, 1536, 1728, 1920, 2048, 2304, 2592, 2880, 3072, 3456, 3840, 4096, 4320, 4608, 5040, 5184, 5760, 6144, 6912, 7680, 7776, 8192, 8640, 9216, 10080, 10368, 11520, 12288, 13824, 14400, 15360, 15552, 16384, 17280, 18432, 20160, 20736, 23040, 24576, 25920, 27648, 28800, 30240, 30720, 31104, 32768, 34560, 36864

Here is what Wikipedia had to say about them:

In mathematics, the Jordan–Pólya numbers are the numbers that can be obtained by multiplying together one or more factorials, not required to be distinct from each other. For instance, 480 is a Jordan–Pólya number because:$$480 =2! \times 2! \times 5!$$Every tree has a number of symmetries that is a Jordan–Pólya number, and every Jordan–Pólya number arises in this way as the order of an automorphism group of a tree. These numbers are named after Camille Jordan and George Pólya, who both wrote about them in the context of symmetries of trees.

These numbers grow more quickly than polynomials but more slowly than exponentials. As well as in the symmetries of trees, they arise as the numbers of transitive orientations of comparability graphs and in the problem of finding factorials that can be represented as products of smaller factorials.

A tree that (as an abstract graph) has 480 symmetries (automorphisms). There are 2 ways of permuting the two children of the upper left vertex, 2 ways of permuting the two children of the upper middle vertex, and 5! = 120 ways of permuting the five children of the upper right vertex, for 2 x 2 x 120 = 480 symmetries altogether.

George Pólya
13 December 1887 - 7 September 1985

George Pólya was one of the greatest mathematicians of the 20th century and there is a brief biography of his life to be found here. To quote from this article:

With no hesitation, George Pólya is my personal hero as a mathematician. ... [he] is not only a distinguished gentleman but a most kind and gentle man: his ebullient enthusiasm, the twinkle in his eye, his tremendous curiosity, his generosity with his time, his spry energetic walk, his warm genuine friendliness, his welcoming visitors into his home and showing them his pictures of great mathematicians he has known - these are all components of his happy personality. As a mathematician, his depth, speed, brilliance, versatility, power and universality are all inspiring. Would that there were a way of teaching and learning these traits.

Camille Jordan
5th January 1838 - 22nd January 1922

Camille Jordan made most of his mathematical contributions in the 19th century and a brief biography can be found here. It can be noted that, quoting from the article:

The Journal de Mathématiques Pure et Appliquées was a leading mathematical journal and played a very significant part in the development of mathematics throughout the 19th century. It was usually known as the Journal de Liouville since Liouville had founded the journal in 1836. Liouville died in 1882 and in 1885 Jordan became editor of the Journal, a role he kept for over 35 years until his death.

Prime Sums Of Digits, Digits Squared And Digits Cubed

Consider the number 27640 (my diurnal age today) with the property that the sum of its digits cubed is a prime number:$$ \begin{align} 27460 &= 2^3+7^3+6^3+4^3 +0^3\\ &= 631 \text{ (prime)} \end{align} $$However, its sum of digits squared is composite:$$ \begin{align} 27460 &= 2^2+7^2+6^3+4^2 +0^2\\ &= 105 \\&=105 \\ &= 3 \times 5 \times 7 \end{align}$$Then again, its sum of digits is prime:$$ \begin{align} 27460 &= 2+7+6+4 +0\\ &= 19 \text{ (prime)} \end{align} $$So the question can be asked as to what numbers, in the range up to 40,000, have the property that the:

• sum of digits is a prime number
• sum of digits squared is a prime number
• sum of digits cubed is a prime number

It turns out that there are 1985 such numbers and they belong to OEIS A245475:

A245475: numbers \(n\) such that the sum of digits, sum of squares of digits, and sum of cubes of digits are all prime.

The sequence begins (permalink):

11, 101, 110, 111, 113, 131, 146, 164, 166, 199, 223, 232, 289, 298, 311, 322, 335, 337, 346, 353, 355, 364, 373, 388, 416, 436, 449, 461, 463, 494, 533, 535, 553, 566, 614, 616, 634, 641, 643, 656, 661, 665, 733, 829, 838, 883, 892, 919, 928, 944, 982, 991, 1001, 1010, 1011, 1013, 1031, 1046, 1064, 1066, 1099

Of these 1985 numbers in the range up to 40,000, 322 are prime themselves. However, many of these numbers are permutations of the digits of other numbers and so it's pertinent to ask how many "root numbers" are there in the range up to 40,000. These "root numbers" will be numbers whose digits are in ascending order such that any permutation of their digits still ensures membership in OEIS A245475. There are only 99 such numbers and they are:

11, 111, 113, 146, 166, 199, 223, 289, 335, 337, 346, 355, 388, 449, 566, 1112, 1114, 1145, 1147, 1244, 1349, 1448, 1499, 1679, 2225, 2227, 2258, 2333, 2458, 2555, 2557, 3347, 3358, 3367, 3466, 3569, 4445, 4667, 5558, 7888, 11111, 11113, 11117, 11122, 11126, 11128, 11137, 11159, 11234, 11245, 11333, 11344, 11366, 11399, 11489, 11777, 12224, 12248, 12347, 12358, 12446, 12488, 12677, 13333, 13339, 13445, 13478, 14455, 14459, 14558, 16888, 17777, 17779, 22225, 22229, 22258, 22348, 22355, 22447, 22577, 22999, 23444, 23455, 23558, 23699, 24779, 24788, 25589, 25688, 28999, 33335, 33368, 33449, 33689, 34444, 34466, 35777, 36668, 36679

Note that these numbers do not contain any zeroes. This is because we can insert any number of zeroes anywhere we want. For example:$$11 \to 10010$$Of these, the following have digits that are all different:$$146, 289, 346, 1349, 1679, 2458, 3569, 12347, 12358, 13478$$

Concatenated Triples Of Cubes and Doubles of Squares

The number associated with my diurnal age today, 27640, has the property that it is a sum of concatentated cubes:$$ \begin{align} 27640 &= 27 \, | \,64  \,|\, 0\\ &= 3^3  \,| \, 4^3 \, |\, 0^3 \end{align}$$I then sought to discover what other numbers in the range up to 40,000 have this property. It turns out that there are 78 such numbers and they are (permalink):

108, 180, 801, 810, 1027, 1064, 1270, 1278, 1640, 1648, 1827, 1864, 2701, 2708, 2710, 2718, 2780, 2781, 6401, 6408, 6410, 6418, 6480, 6481, 8027, 8064, 8127, 8164, 8270, 8271, 8640, 8641, 10125, 10216, 10343, 10512, 10729, 11250, 11258, 12160, 12168, 12501, 12508, 12510, 12518, 12580, 12581, 12764, 13430, 13438, 15120, 15128, 16427, 17290, 17298, 18125, 18216, 18343, 18512, 18729, 21601, 21608, 21610, 21618, 21680, 21681, 27064, 27164, 27640, 27641, 27648, 27864, 34301, 34308, 34310, 34318, 34380, 34381

Let's take the last member of the above set:$$ \begin{align} 34381 &= 343 \, | \, 8 \, | \, 1\\ & =7^3 \, | \, 2^3 \, | \, 1^3 \end{align} $$It can be noted that 27640 and 27641 form a pair of consecutive numbers sharing this same property. In the range up to 40,000 this pairing occurs as shown:

• 2780 and 2781
• 6480 and 6481
• 8270 and 8271
• 8640 and 8641
• 12580 and 12581
• 21680 and 21681
• 27640 and 27641
• 34380 and 34381

If instead of cubes, we consider squares and instead of triples we consider doubles then we have the following 557 numbers in the range up to 40,000 (permalink):

10, 14, 19, 40, 41, 49, 90, 91, 94, 116, 125, 136, 149, 160, 161, 164, 164, 169, 181, 250, 251, 254, 259, 360, 361, 364, 369, 416, 425, 436, 449, 464, 481, 490, 491, 494, 499, 640, 641, 644, 649, 810, 811, 814, 819, 916, 925, 936, 949, 964, 981, 1000, 1001, 1004, 1009, 1100, 1121, 1144, 1169, 1196, 1210, 1211, 1214, 1219, 1225, 1256, 1289, 1324, 1361, 1400, 1440, 1441, 1441, 1444, 1449, 1484, 1529, 1576, 1625, 1625, 1636, 1649, 1664, 1676, 1681, 1690, 1691, 1694, 1699, 1729, 1784, 1841, 1900, 1960, 1961, 1961, 1964, 1969, 2250, 2251, 2254, 2259, 2516, 2536, 2549, 2560, 2561, 2564, 2564, 2569, 2581, 2890, 2891, 2894, 2899, 3240, 3241, 3244, 3249, 3610, 3611, 3614, 3616, 3619, 3625, 3649, 3664, 3681, 4000, 4001, 4004, 4009, 4100, 4121, 4144, 4169, 4196, 4225, 4256, 4289, 4324, 4361, 4400, 4410, 4411, 4414, 4419, 4441, 4484, 4529, 4576, 4625, 4676, 4729, 4784, 4840, 4841, 4841, 4844, 4849, 4900, 4916, 4925, 4936, 4961, 4964, 4981, 5290, 5291, 5294, 5299, 5760, 5761, 5764, 5769, 6250, 6251, 6254, 6259, 6416, 6425, 6436, 6449, 6481, 6760, 6761, 6764, 6769, 7290, 7291, 7294, 7299, 7840, 7841, 7844, 7849, 8116, 8125, 8136, 8149, 8164, 8410, 8411, 8414, 8419, 9000, 9001, 9004, 9009, 9100, 9121, 9144, 9169, 9196, 9225, 9256, 9289, 9324, 9361, 9400, 9441, 9484, 9529, 9576, 9610, 9611, 9614, 9619, 9625, 9676, 9729, 9784, 9841, 9900, 9961, 10016, 10025, 10036, 10049, 10064, 10081, 10240, 10241, 10244, 10249, 10890, 10891, 10894, 10899, 11024, 11089, 11156, 11225, 11296, 11369, 11444, 11521, 11560, 11561, 11564, 11569, 11600, 11681, 11764, 11849, 11936, 12025, 12116, 12116, 12125, 12136, 12149, 12164, 12181, 12209, 12250, 12251, 12254, 12259, 12304, 12401, 12500, 12601, 12704, 12809, 12916, 12960, 12961, 12964, 12969, 13025, 13136, 13249, 13364, 13481, 13600, 13690, 13691, 13694, 13699, 13721, 13844, 13969, 14096, 14225, 14356, 14416, 14425, 14436, 14440, 14441, 14444, 14449, 14449, 14464, 14481, 14489, 14624, 14761, 14900, 15041, 15184, 15210, 15211, 15214, 15219, 15329, 15476, 15625, 15776, 15929, 16000, 16001, 16004, 16009, 16084, 16100, 16121, 16144, 16169, 16196, 16225, 16241, 16256, 16289, 16324, 16361, 16400, 16400, 16441, 16484, 16529, 16561, 16576, 16625, 16676, 16724, 16729, 16784, 16810, 16811, 16814, 16819, 16841, 16889, 16900, 16916, 16925, 16936, 16949, 16961, 16964, 16981, 17056, 17225, 17396, 17569, 17640, 17641, 17644, 17649, 17744, 17921, 18100, 18281, 18464, 18490, 18491, 18494, 18499, 18649, 18836, 19025, 19216, 19360, 19361, 19364, 19369, 19409, 19604, 19616, 19625, 19636, 19649, 19664, 19681, 19801, 20250, 20251, 20254, 20259, 21160, 21161, 21164, 21169, 22090, 22091, 22094, 22099, 22516, 22525, 22536, 22549, 22564, 22581, 23040, 23041, 23044, 23049, 24010, 24011, 24014, 24019, 25000, 25001, 25004, 25009, 25100, 25121, 25144, 25169, 25196, 25225, 25256, 25289, 25324, 25361, 25400, 25441, 25484, 25529, 25576, 25616, 25625, 25625, 25636, 25649, 25664, 25676, 25681, 25729, 25784, 25841, 25900, 25961, 26010, 26011, 26014, 26019, 27040, 27041, 27044, 27049, 28090, 28091, 28094, 28099, 28916, 28925, 28936, 28949, 28964, 28981, 29160, 29161, 29164, 29169, 30250, 30251, 30254, 30259, 31360, 31361, 31364, 31369, 32416, 32425, 32436, 32449, 32464, 32481, 32490, 32491, 32494, 32499, 33640, 33641, 33644, 33649, 34810, 34811, 34814, 34819, 36000, 36001, 36004, 36009, 36100, 36116, 36121, 36125, 36136, 36144, 36149, 36164, 36169, 36181, 36196, 36225, 36256, 36289, 36324, 36361, 36400, 36441, 36484, 36529, 36576, 36625, 36676, 36729, 36784, 36841, 36900, 36961, 37210, 37211, 37214, 37219, 38440, 38441, 38444, 38449, 39690, 39691, 39694, 39699

Let's take the last number in the above set of numbers:$$ \begin{align} 39699 &= 3969 \, | \, 9 \\ &= 63^2 \, | \, 3^2 \end{align}$$One more example is:$$ \begin{align} 36000 &= 3600 \, | \, 0 \\ &= 60^2 \, | \, 0^2 \end{align} $$There are obviously many other variation on these themes but that will suffice for now.