Question 3:
(a) The Venn diagrams in the answer space shows sets P and Q such that the universal set, ξ = P υ Q.
Shade the set P ∩ Q.
(b) The Venn diagrams in the answer space shows sets X and Y and Z, such that the universal set, ξ = X υ Y υ Z.
Shade the set (X υ Z) ∩ Y.
Solution:
(a)
• P ∩ Q means the intersection of the region P and the region Q.
(b)
• (X υ Z) means the union of the region X and the region Z.
• The region then intersects with region Y to give the result (X υ Z) ∩ Y.
(a) The Venn diagrams in the answer space shows sets P and Q such that the universal set, ξ = P υ Q.
Shade the set P ∩ Q.
(b) The Venn diagrams in the answer space shows sets X and Y and Z, such that the universal set, ξ = X υ Y υ Z.
Shade the set (X υ Z) ∩ Y.
Solution:
(a)
• P ∩ Q means the intersection of the region P and the region Q.
(b)
• (X υ Z) means the union of the region X and the region Z.
• The region then intersects with region Y to give the result (X υ Z) ∩ Y.
Question 4:
The Venn diagrams in the answer space shows sets P, Q and R such that the universal set, ξ = P υ Q υ R
On the diagrams in the answer space, shade
(a) P ∩ R’,
(b) P’υ (Q ∩ R).
Solution:
(a)
P ∩ R’
(b)
P’υ (Q ∩ R)
The Venn diagrams in the answer space shows sets P, Q and R such that the universal set, ξ = P υ Q υ R
On the diagrams in the answer space, shade
(a) P ∩ R’,
(b) P’υ (Q ∩ R).
(a)
P ∩ R’
P’υ (Q ∩ R)
