If A = {x: x is a natural number}, B ={x: x is an even natural number}
C = {x: x is an odd natural number} and D = {x: x is a prime number}, find
(i) \(A ∩ B\)
(ii) \(A ∩ C\)
(iii) \(A ∩ D\)
(iv) \(B ∩ C\)
(v) \(B ∩ D\)
(vi) \(C ∩ D\)
C = {x: x is an odd natural number} and D = {x: x is a prime number}, find
(i) \(A ∩ B\)
(ii) \(A ∩ C\)
(iii) \(A ∩ D\)
(iv) \(B ∩ C\)
(v) \(B ∩ D\)
(vi) \(C ∩ D\)
Solution and Explanation
A = {x: x is a natural number} = {1, 2, 3, 4, 5 ...}
B = {x: x is an even natural number} = {2, 4, 6, 8 ...}
C = {x: x is an odd natural number} = {1, 3, 5, 7, 9 ...}
D = {x: x is a prime number} = {2, 3, 5, 7 ...}
(i) \(A ∩B\) = {x: x is a even natural number} = B
(ii) \(A ∩C\) = {x: x is an odd natural number} = C
(iii) \(A ∩D\) = {x: x is a prime number} = D
(iv) \(B ∩C = \phi\)
(v) \(B ∩D\) = {2}
(vi) \(C ∩D\) = {x: x is odd prime number}
Top CBSE Class XI Mathematics Questions
- A coin is tossed twice, what is the probability that atleast one tail occurs?
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\(f(x) = \begin{cases} x^2, & \quad 0≤x≤3\\ 3x, & \quad 3≤x≤10 \end{cases}\)
The relation g is defined by
\(g(x) = \begin{cases} x^2, & \quad 0≤x≤2\\ 3x, & \quad 2≤x≤10 \end{cases}\)
Show that f is a function and g is not a function. - Let \(f={(x,\frac {x^2}{1+x^2}):x∈R}\) be a function from R into R. Determine the range of f.
- How many 4-letter code can be formed using the first 10 letters of the English alphabet, if no letter can be repeated?
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Top CBSE Class XI Questions
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Concepts Used:
Operations on Sets
Some important operations on sets include union, intersection, difference, and the complement of a set, a brief explanation of operations on sets is as follows:
1. Union of Sets:
- The union of sets lists the elements in set A and set B or the elements in both set A and set B.
- For example, {3,4} ∪ {1, 4} = {1, 3, 4}
- It is denoted as “A U B”
2. Intersection of Sets:
- Intersection of sets lists the common elements in set A and B.
- For example, {3,4} ∪ {1, 4} = {4}
- It is denoted as “A ∩ B”
3.Set Difference:
- Set difference is the list of elements in set A which is not present in set B
- For example, {3,4} - {1, 4} = {3}
- It is denoted as “A - B”
4.Set Complement:
- The set complement is the list of all elements present in the Universal set except the elements present in set A
- It is denoted as “U-A”