Math, asked by gungungupta465674, 5 months ago

proof of fundamental theoram of arithmetic

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Answered by radheshyam6441

7

Answer:

The Fundamental Theorem of Arithmetic says that any positive integer greater than 1 can be written as a product of finitely many primes uniquely up to their order. The term "up to thier order" means that we consider 12=22⋅3 to be equivalent as 12=3⋅22.

Answered by PriyankaPriyanka

6

Answer:

|| ✰ᴀɴsᴡᴇʀ✰ ||

The Fundamental Theorem of Arithmetic says that any positive integer greater than 1 can be written as a product of finitely many primes uniquely up to their order. The term "up to thier order" means that we consider 12=22⋅3 to be equivalent as 12=3⋅22. Note that a product can consist of just one prime.

|| ☬☨ᴍɪss_ɪɴɴᴏᴄᴇɴᴛ☨☬ ||

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