Let A = {1,2,3...........9} and R be the relation in A×A defined by (a,b)R(c,d) if a+d = b+ c for (a,b),(c,d) in A×A . Prove that R is an transitive relation
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Answered by
0
Hey mate....
here's the answer....
Let (a,b)R(c,d)and(c,d)R(e,f
)(a,b)R(c,d)and(c,d)R(e,f)
a+b=b+ca+b=b+c
and c+f=d+ec+f=d+e
a+b=b+ca+b=b+c
=>a−c=b−d(1)c+f=d+e(2)
=>a−c=b−d(1)c+f=d+e(2)
adding (1) and (2)
a−c+c+f=b−d+d+ea
−c+c+f=b−d+d+e
a+f=b+ea+f=b+e
=>(a,b)R(e,f)
=>(a,b)R(e,f)
R is transitive
Hope this helps❤
Answered by
0
For all (a,b) (c,d) (e,f) belong to A×A
we have
(a,b)R(c,d) and (c,d) R( e,f)
a+d= b+c and c+f= d+e
a+d+c+f= b+c+d+e
a+f =b+e
(a,b) R(e,f)
Thus R is transitive on A×A
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