Math, asked by Anonymous, 2 months ago

3. If U = {a, e, i, o, u}, A = {a, e, i}, B = {e, o, u},
C = {a, i, u), then :
(i) What is A UU?
(ii) What is A U U?
(iii) What is AU ∅?
(iv) What is A Interaction ∅?
(v) Verify that A N (B - C) = (A intersection B) – (A InteractionC).
(vi) Verify that A - (B U C) = (A - B) interaction (A - C).
(vii) Verify that A - (B interaction C) = (A - B) U (A - C).

Answers

Answered by daisyDrishti
3

(i) A UU = {a,e,i,o,u}

(ii) A U U = {a,e,i,o,u}

(iii) AU ∅= {a, e, i}

(iv) A Interaction ∅= ∅

(v) s A intersection (B-C) = (A intersection B)-(A intersection C)

Two sets are equal if both are subsets of each other.

Let x∈A∩(B−C).

⇒x∈A and x∈(B−C)⇒x∈B and x∉C.

⇒x∈A∩B and x∉A∩C⇒x∈A∩B−A∩C.

⇒A∩(B−C)⊂A∩B−A∩C.

Let x∈A∩B−A∩C.

⇒x∈A∩B and x∉A∩C.

⇒x∈A,x∈B and x∉C.

⇒x∈A and x∈B−C.

⇒x∈A∩(B−C).

⇒A∩B−A∩C⊂A∩(B−C).

⇒A∩(B−C)=A∩B−A∩C.

(vi) Let A, B, and C be three sets. Prove that A-(BUC) = (A-B) ∩ (A-C)

L.H.S = A - (B U C)

A ∩ (B U C)c

A ∩ (B c ∩ Cc)

(A ∩ Bc) ∩ (A∩ Cc)

(AUB) ∩ (AUC)

R.H.S = (A-B) ∩ (A-C)

(A∩Bc) ∩ (A∩Cc)

(AUB) ∩ (AUC)

L.H.S = R.H.S

(vii) Let x in A ∩ (B U C)

Then x is in A and x is in (B U C).

If x is in B, then x is in A ∩ B.

If x is not in B, then x is in C, so x is in A ∩ C.

Thus x is in (A ∩ B) U (A ∩ C), and A ∩ (B U C) ⊆ (A ∩ B) U (A ∩ C).

Now assume x in (A ∩ B) U (A ∩ C) and similarly show that x is in A ∩ (B U C).

Then (A ∩ B) U (A ∩ C) ⊆ A ∩ (B U C).

So (A ∩ B) U (A ∩ C) = A ∩ (B U C)

hope it will help u☺️

Answered by arshdeep9643
2

Answer:

aujla ni aujla

Step-by-step explanation:

lobe you meri siso jaan

Similar questions