if a={3n|n in Z^+} and b={3^{2m}|m in Z^+}

cubanwongux

cubanwongux

Answered question

2022-09-05

if
a = { 3 n n Z + }
and
b = { 3 2 m m Z + } ,
prove that b is a subset of a.
I think the question is wrong. I think a should be a subset of b.

Answer & Explanation

Kristopher Beard

Kristopher Beard

Beginner2022-09-06Added 18 answers

Step 1
A cannot be a subset of B. For example 6 is a multiple of 3, but 6 is not a multiple of 9. However, anything that is a multiple of 9, is a multiple of 3, since 9 = 3 2 .
An accepted proof is as follows.
A = { 3 n : n Z + } B = { 9 m : m Z + }
Step 2
Let x be in B. Then there exists k Z + such that x = 9 k. But this is x = 3 ( 3 k ). Since k is a positive integer, so is 3k. Let j = 3 k. So there is j Z + such that x = 3 j. But this satisfies the definition of A, so x is in A.
Since x was arbitrary, it follows that B A.

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