Let S be the equivalence relation on P({1,2,3,4}) — {0} defined by XSY if and only if max(X) – |X| = max(Y) - Y| where max(X) is the greatest element of X and max(Y) is the greatest element of Y. Write down the equivalence Moses of S and briefly explain why these are the [Brief explanation required.] equivalence classes. sit vers 20% 2022 2022 Asso sessal ssable
Let S be the equivalence relation on P({1,2,3,4}) — {0} defined by XSY if and only if max(X) – |X| = max(Y) - Y| where max(X) is the greatest element of X and max(Y) is the greatest element of Y. Write down the equivalence Moses of S and briefly explain why these are the [Brief explanation required.] equivalence classes. sit vers 20% 2022 2022 Asso sessal ssable
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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Please give me correct solution in 20 minutes.
![Let S be the equivalence relation on P({1,2,3,4}) — {Ø} defined by XSY if and only if max(X) –
|X| = max(Y) — |Y| where max(X) is the greatest element of X and max(Y) is the greatest
element of Y. Write down the equivalence
Mes
of S and briefly explain why these are the
[Brief explanation required.]
equivalence classes.
nive
sit
vers
20
2022
2022
Asso
sessak
ssable
as](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F966ca0fc-77ec-4200-9e02-82ce23d32cf8%2F51cb95d2-ffce-41a5-a07b-e9ab39d494ca%2Ffvurx2b_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Let S be the equivalence relation on P({1,2,3,4}) — {Ø} defined by XSY if and only if max(X) –
|X| = max(Y) — |Y| where max(X) is the greatest element of X and max(Y) is the greatest
element of Y. Write down the equivalence
Mes
of S and briefly explain why these are the
[Brief explanation required.]
equivalence classes.
nive
sit
vers
20
2022
2022
Asso
sessak
ssable
as
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