Question 14 Marks
A class teacher Mamta Sharma of class XI write three sets A, Band Care such that A = {1, 3, 5, 7, 9}, B = {2, 4, 6, 8} and C = {2, 3, 5, 7, 11}.
Answer the following questions which are based on above sets.
Answer the following questions which are based on above sets.
- Find $\text{A}\cap\text{B}.$
- {3, 5, 7}
- $\phi$
- {1, 5, 7}
- {2, 5, 7}
- Find $\text{A}\cap\text{C}.$
- {3, 5, 7}
- {1, 5, 7}
- $\phi$
- {3, 4, 7}
- Which of the following is correct for two sets A and B to be disjoint?
- $\text{A}\cap\text{B}=\phi$
- $\text{A}\cap\text{B}\neq\phi$
- $\text{A}\cup\text{B}=\phi$
- $\text{A}\cup\text{B}\neq\phi$
- Which of the following is correct for two sets A and C to be intersecting?
- $\text{A}\cap\text{C}=\phi$
- $\text{A}\cap\text{C}\neq\phi$
- $\text{A}\cup\text{C}=\phi$
- $\text{A}\cup\text{C}\neq\phi$
- Write the n[P(B)].
- 8
- 4
- 16
- 12
Answer
View full question & answer→We have, A = {1, 3, 5, 7, 9}, B = {2, 4, 6, 8} and C = {2, 3, 5, 7, 11}
- (b) $\phi$
Solution:
$\text{A}\cap\text{B}=\{1,3,5,7,9\}\cap\{2,4,6,8\}$
$=\phi$
- (a) {3, 5, 7}
Solution:
$\text{A}\cap\text{C}=\{1,3,5,7,9\}\cap\{2,3,5,7,11\}$
$=\{3,5,7\}$
- (a) $\text{A}\cap\text{B}=\phi$
Solution:
Here, $\text{A}\cap\text{B}=\phi$
- (b) $\text{A}\cap\text{C}\neq\phi$
Solution:
The correct option for intersecting of two sets A and C is
$\text{A}\cap\text{C}\neq\phi$
- (c) 16
Solution:
The number of elements in set B are 4.
Therefore, the number of elements in n[P(B)] are 24 i.e. 16.
where, a = Number of students who had M only b = Number of students who had M and C only c = Number of students who had C only d = Number of students who had T only e = Number of students who had M and T only f = Number of students who had three drinks M, C, T and g = Number of students who had C and T only Then, we have a = 12, b + f = 20, c = 5, d = 8, e + f = 25, f = 10 and g + f = 30 a = 12, b = 10, c = 5, d = 8, e = 15, f = 10 and g = 20 
From the Venn diagram, we get, the number of students who offered Physics. = (40 - x) + x + (20 - x) + 8 = 65 [given] ⇒ 68 - x = 65 ⇒ x = 3 
Where, a = Number of students who participated in dance only b = Number of students who participated in dance and drama only c = Number of students who participated in drama only d = Number of students who participated in singing only e = Number of students who participated in dance and singing only f = Number of students who participated in all three events dance, drama and singing and g = Number of students who participated in drama and singing only Then, we have a = 8, b + f = 25, c = 5, d = 12, e + f = 30, f = 15 and g + f = 20 ⇒ a = 8, b = 10, c = 5, d = 12, e = 15, f = 15 and g = 5