Example 20. Let I be the set of all integers, m be a positie integer and be the mean byR = {(x, y): *.ye Ix-y is divisible by m). prove it About the author Alexandra
Answer: Sʜᴀʟʟ ᴡᴇ ʙᴇ ғʀɪᴇɴᴅs . ɪғ ʏᴏᴜ ᴡᴀɴɴᴀ ᴛʜᴇɴ Step-by-step explanation: Consider any a,b,c∈Z. Since a−a=0=3.0⇒(a−a) is divisible by 3. ⇒(a,a)∈R⇒ is reflexive. Let (a,b)∈R⇒(a−b) is divisible by 3. ⇒a−b=3q for some q∈Z⇒b−a=3(−q) ⇒(b−a) is divisible by 3 (∵q∈Z⇒−q∈Z⇒−q∈Z) Thus, (a,b)∈R⇒(b,a)∈R⇒R is symmetric. Let (a,b)∈R and (b,c)∈R ⇒(a−b) is divisible by 3 and (b−c) is divisible by 3 ⇒a−b=3q and b−c=3q′ for some q,q′∈Z ⇒(a−b)+(b−c)=3(q+q′)⇒a−c=3(q+q′) ⇒(a−c) is divisible by 3 (∵q.q′∈Z⇒q+q′∈Z) ⇒(a,c)∈R Thus, (a,b)∈R and (b,c)∈R⇒(a,c)∈R⇒R is transitive. Therefore, the relation R is reflexive, symmetric and transitive, and hence it is an equivalence relation. Reply
Answer:
Sʜᴀʟʟ ᴡᴇ ʙᴇ ғʀɪᴇɴᴅs . ɪғ ʏᴏᴜ ᴡᴀɴɴᴀ ᴛʜᴇɴ
Step-by-step explanation:
Consider any a,b,c∈Z.
Since a−a=0=3.0⇒(a−a) is divisible by 3.
⇒(a,a)∈R⇒ is reflexive.
Let (a,b)∈R⇒(a−b) is divisible by 3.
⇒a−b=3q for some q∈Z⇒b−a=3(−q)
⇒(b−a) is divisible by 3 (∵q∈Z⇒−q∈Z⇒−q∈Z)
Thus, (a,b)∈R⇒(b,a)∈R⇒R is symmetric.
Let (a,b)∈R and (b,c)∈R
⇒(a−b) is divisible by 3 and (b−c) is divisible by 3
⇒a−b=3q and b−c=3q′ for some q,q′∈Z
⇒(a−b)+(b−c)=3(q+q′)⇒a−c=3(q+q′)
⇒(a−c) is divisible by 3 (∵q.q′∈Z⇒q+q′∈Z)
⇒(a,c)∈R
Thus, (a,b)∈R and (b,c)∈R⇒(a,c)∈R⇒R is transitive.
Therefore, the relation R is reflexive, symmetric and transitive, and hence it is an equivalence relation.
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