WebA seven digit number that describes itself is the number 3211000. The number has 3 zeros and the number has 2 ones. WebFeb 6, 2024 · So this leads us to an interesting question: Is there a mathematical equation that describes itself? The answer, it turns out, is yes. It’s called Tupper’s Self-Referential …
Autological Words - Segerman
Web[#61 +2164 95] The number 14233221 describes itself; it has one four, two threes, three twos, and two ones. [/r/Showerthoughts] Close. 116. Posted by 6 years ago. Archived ... Not quite, this one describes itself instead of the previous number in … WebA seven digit number that describes itself is the number 3211000. The number has 3 zeros and the number has 2 ones. Thank you so much :) In the number 3211000, there are 3 zeros, 2 ones, 1 two, 0 threes, and 0 fours. It also has 7 digits. Can you explain it little bit more?? Advertisement Previous Next Advertisement mls calgary ab
Self-descriptive number - Wikipedia
WebA word is autological or homological if it describes itself. The common term for this is a backronym, a back-formation acronym. Also known as recursive acronym / metacronym/ recursive initialism, this is a fun way to coin … In mathematics, a self-descriptive number is an integer m that in a given base b is b digits long in which each digit d at position n (the most significant digit being at position 0 and the least significant at position b−1) counts how many instances of digit n are in m. See more For example, in base 10, the number 6210001000 is self-descriptive because of the following reasons: In base 10, the number has 10 digits, indicating its base; It contains 6 at position 0, indicating that … See more A generalization of the self-descriptive numbers, called the autobiographical numbers, allow fewer digits than the base, as long as the digits that are included in the number suffice to completely describe it. e.g. in base 10, 3211000 has 3 zeros, 2 ones, 1 two, and 1 … See more There are no self-descriptive numbers in bases 2, 3 or 6. In bases 7 and above, there is, if nothing else, a self-descriptive number of the form See more From the numbers listed in the table, it would seem that all self-descriptive numbers have digit sums equal to their base, and that … See more • Khovanova, Tanya (23 August 2024). "Can You Solve the Leonardo da Vinci Riddle?". Lesson about autobiographical numbers. TED-Ed. See more WebMay 1, 2024 · Sesquipedalianism is a sesquipedalianism. This observations brings me to the peculiar but fascinating question of whether a word that literally describes itself has been identified by some general category of words, which may itself have been given a term. linguistics rare-words Share Improve this question Follow edited Jul 22, 2024 at 8:32 mls byron street victoria