Show that the following four conditions are equivalent :
(i) A c B(ii) A - B = 0 (iii) AU B = B (iv) A n B = A
Answers
Answer:
First, we have to show that (i) ⇔ (ii).
(i)⇒ (ii).
Let A⊂B
To show: A−B=ϕ
If possible, suppose A−B
=ϕ
This means that there exists x∈A,x∈
/
B, which is not possible as A⊂B.
∴A−B=ϕ
∴A⊂B⇒A−B=ϕ
(ii)⇒ (i).
Let A−B=ϕ
To show: A⊂B
Let xϵA
Clearly, xϵB because if x
ϵB, then A−B
=ϕ
∴A−B=ϕ⇒A⊂B
Hence, (ii)⇔(i)
(i)⇒ (iii).
Let A⊂B
To show: A∪B=B
Clearly, B⊂A∪B
Let xϵA∪B
⇒xϵA or xϵB
Case I: xϵA
⇒xϵB [∵A⊂B]
∴A∪B⊂B
Case II: xϵB
Then A∪B⊂B
So, A∪B=B
(iii)⇒ (i).
Conversely, let A∪B=B
To show : A⊂B
Let xϵA
⇒xϵA∪B [∵A⊂A∪B]
⇒xϵB [∵A∪B=B]
∴A⊂B
Hence, (iii)⇔(i)
Now, we have to show that (i)⇔(iv).
Let A⊂B
Clearly A∩B⊂A
Let xϵA
We have to show that xϵA∩B
As A⊂B,xϵB
∴xϵA∩B
∴A⊂A∩B
Hence, A=A∩B
Conversely, suppose A∩B=A
Let xϵA
⇒xϵA∩B
⇒xϵA and xϵB
⇒xϵB
∴A⊂B
Hence, (i)⇔(iv).
Step-by-step explanation: