Difference between revisions of "User:Vincentwant"

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<math>2032 = 2^4\cdot 127 \text{ (has 10 factors)}</math>
 
<math>2032 = 2^4\cdot 127 \text{ (has 10 factors)}</math>
  
$2033 = 19\cdot 107 \text{ (has 4 factors)}
+
<math>2033 = 19\cdot 107 \text{ (has 4 factors)}</math>

Revision as of 10:10, 9 December 2020

I am listing the prime factorizations of upcoming years. I am doing this because some math competitions often involve the factorization of the year it was assessed. Thanks to Po-Shen Loh for giving me this idea. (Factors include 1 and the number itself.)

$2021 = 43\cdot 47 \text{ (has 4 factors)}$

$2022 = 2\cdot 3\cdot 337 \text{ (has 8 factors)}$

$2023 = 7\cdot 17^2 \text{ (has 6 factors)}$

$2024 = 2^3\cdot 11\cdot 23 \text{ (has 12 factors)}$

$2025 = 3^4\cdot 5^2 \text{ (has 15 factors)}$

$2026 = 2\cdot 1013 \text{ (has 4 factors)}$

$2027 = \text{2027 is prime (has 2 factors)}$

$2028 = 2^2\cdot 3\cdot 13^2 \text{ (has 18 factors)}$

$2029 = \text{2029 is prime (has 2 factors)}$

$2030 = 2\cdot 5\cdot 7\cdot 29 \text{ (has 16 factors)}$

$2031 = 3\cdot 677 \text{ (has 4 factors)}$

$2032 = 2^4\cdot 127 \text{ (has 10 factors)}$

$2033 = 19\cdot 107 \text{ (has 4 factors)}$