There are lots of ways to split the integers into two sets whose intersection is empty. An example is to let A = {odd integers} and B = {even integers}. Note that the union of these sets is all the integers but no individual number is in both sets (i.e. union is everything and intersection is empty). Define another way to accomplish this that is different than the example provided. Note that you can use a different group other than integers if you like
There are lots of ways to split the integers into two sets whose intersection is empty. An example is to let A = {odd integers} and B = {even integers}. Note that the union of these sets is all the integers but no individual number is in both sets (i.e. union is everything and intersection is empty). Define another way to accomplish this that is different than the example provided. Note that you can use a different group other than integers if you like
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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There are lots of ways to split the integers into two sets whose intersection is empty. An example is to let A = {odd integers} and B = {even integers}. Note that the union of these sets is all the integers but no individual number is in both sets (i.e. union is everything and intersection is empty). Define another way to accomplish this that is different than the example provided. Note that you can use a different group other than integers if you like.
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Step 1
Let, A= { integers greater than or equal to 0}
and B={ integers less than 0}
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