Let S = {10n - 1 : n \in Z}, T be the set of odd integers, and U = {6m + 4 : m \in Z} Prove that discrete math S \subseteq T \cap U.

pedzenekO

pedzenekO

Answered question

2021-08-02

Let S={10n1:nZ}, T be the set of odd integers, and U={6m+4:mZ}
Prove that discrete math STU.

Answer & Explanation

yagombyeR

yagombyeR

Skilled2021-08-03Added 92 answers

Consider the given information.
Here,
S={10n1:nZ}
And,
U={5m+4:mZ}
And, the set T is the set of odd integers.
So, the set is defined as,
T={2k+11:kZ}
Now, find the first TU.
Let k is the arbitrary element of S.
Thus,
k=10n1nZ
= 10n − 1 + 2 − 2
= (10n − 2) + 1
= 2 (5n − 1) + 1
Here, (5n - 1) is belongs to integers.
Let (5n - 1) is equal p. Put the value in the expression.
Thus,
k=2p+1T
Thus, the number k belongs to T.
kT
Now, define for S.
k = 10n − 1
= 10n − 1 + 5 − 5
= (10n − 5) + 4
= 5(2n − 1) + 4
Let (2n - 1) is equal m. Put the value in the expression.
Thus,
k=5m+4U
Thus, the number k belongs to S.
kU
From the above both the result, the given condition proved.
STU.

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