I’m not sure how to proceed with this proof. pa where p;Prove that if n = pa.... par whereprimes, then (n) (n) = r² (1 - p)... (1-par-proof.PrLet n = pa.... par, where pi are primes.F(n) = (a₁ +1)... (as +1)(n) = n(1-p)... (1-/Pr)ar-1).

Answered: Image /qna-images/answer/afaf6324-b8e0-4553-bf3b-8c25e3f35500.jpg

Prove that if n = pa.... par where primes, then proof. pa where p; (n)b(n) = r² (1 - p).. (1-prar- 25-1). Pr Let n = pa.... par, where pi are primes. F(n) = (a₁ +1)... (as +1) (a+1) (n) = n(1-p)... (1-/Pr)

Prove that if n = pa.... par where primes, then proof. pa where p; (n)b(n) = r² (1 - p).. (1-prar- 25-1). Pr Let n = pa.... par, where pi are primes. F(n) = (a₁ +1)... (as +1) (a+1) (n) = n(1-p)... (1-/Pr)

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter1: Fundamental Concepts Of Algebra

Section1.1: Real Numbers

Problem 39E

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I’m not sure how to proceed with this proof.

pa where p;
Prove that if n = pa.... par where
primes, then (n) (n) = r² (1 - p)... (1-par-
proof.
Pr
Let n = pa.... par, where pi are primes.
F(n) = (a₁ +1)... (as +1)
(n) = n(1-p)... (1-/Pr)
ar-1).

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