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ISRO2011-27

in Set Theory & Algebra retagged by
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7 votes
7 votes

Which one of the following is true?

  1. $R \cap S = ( R \cup S) - [(R-S) \cup (S-R)]$
  2. $R \cup S = ( R \cap S) - [(R-S) \cup (S-R)]$
  3. $R \cap S = ( R \cup S) - [(R-S) \cap (S-R)]$
  4. $R \cap S = ( R \cup S) \cup (R-S)$
in Set Theory & Algebra retagged by
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4 Answers

15 votes
15 votes
Best answer

A.    $R \cap S = ( R \cup S) - [(R-S) \cup (S-R)]$

{ 2 } = { 1 , 2 , 3 } - [ {1} ∪ {3} ]

{ 2 } = { 2 }

B.   $R \cup S = ( R \cap S) - [(R-S) \cup (S-R)]$

{ 1 , 2 , 3}   { 2 } - [ 1,3 ]

C.    $R \cap S = ( R \cup S) - [(R-S) \cap (S-R)]$

{ 2 }   { 1 , 2 , 3 } - [ 1 ∩ 3 ]

D.    $R \cap S = ( R \cup S) \cup (R-S)$

{ 2 } =  { 1 , 2 , 3 } ∪{1}

{ 2 }   { 1 , 2 , 3 }

Hence.Option(A)  $R \cap S = ( R \cup S) - [(R-S) \cup (S-R)]$ is the correct choice.

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3 votes
3 votes

Answer is option [a] 

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2 Comments

by
alternatively we can verify by making venn diagrams
2
2
by
yes..
0
0
1 vote
1 vote
option A is correct simply draw venn diagrams with two sets R and S having some part in common

R intersection S will be =R union S (which cover all area of R and S)-(symmetric difference R-S union symmetric diff S-R)
by
1 vote
1 vote
Set Theory Formula:

$A - B = A\bigcap B{}' = A.B'$

With this formula

Option a becomes:

$(R + S) - [RS' + SR'] =(R + S)[RS' + SR']'

=(R + S)(R' + S)(S' + R)

=[R + (S.S')](R' + S)

=[R + 0](R' + S)

=R(R' + S)

=RS =R \cap S =LHS$
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