Class 11-science RD SHARMA Solutions Maths Chapter 1 - Sets
Ex. 1.1
Ex. 1.6
Ex. 1.7
Ex. 1.2
Ex. 1.3
Ex. 1.4
Ex. 1.5
Ex. 1.8
Ex. 1VSAQ
Sets Exercise Ex. 1.1
Solution 1
Solution 2
Solution 3
Sets Exercise Ex. 1.6
Solution 2(i)
Solution 2(ii)
Solution 2(iii)
Solution 2(iv)
Solution 2(v)
Solution 2(vi)
Solution 4(i)
Solution 4(ii)
Solution 4(iii)
Solution 14(i)
Solution 14(ii)
Solution 15
Solution 1
Solution 3(i)
Solution 3(ii)
Solution 5
Solution 6(i)
Solution 6(ii)
Solution 7
Solution 8
Solution 9
Solution 10
Solution 11
Solution 12(i)
Solution 12(ii)
Solution 13
Sets Exercise Ex. 1.7
Solution 4(i)
Solution 4(ii)
Solution 4(iii)
Solution 4(iv)
Solution 4(v)
Solution 1
Solution 2(i)
Solution 2(ii)
Solution 2(iii)
Solution 2(iv)
Solution 3
Sets Exercise Ex. 1.2
Solution 1(i)
Solution 1(ii)
Solution 1(iii)
Solution 1(iv)
Solution 1(v)
Solution 1(vi)
Solution 1(vii)
Solution 1(viii)
Solution 1(ix)
Solution 2(i)
Solution 2(ii)
Solution 2(iii)
Solution 2(iv)
Solution 2(v)
Solution 2(vi)
Solution 2(vii)
Solution 2(viii)
Solution 3(i)
Solution 3(ii)
Solution 3(iii)
Solution 3(iv)
Solution 3(v)
Solution 3(vi)
Solution 4
Solution 5
Solution 6
Solution 7
Sets Exercise Ex. 1.3
Solution 1
Solution 2
Solution 3
Solution 4
Solution 5
Solution 6
Solution 7
Solution 8
Solution 9
Sets Exercise Ex. 1.4
Solution 1
Solution 2
Solution 3
Solution 4(i)
Solution 4(ii)
Solution 4(iii)
Solution 4(iv)
Solution 4(v)
Solution 4(vi)
Solution 5
Solution 6
Solution 7
Solution 8
Solution 9
Solution 10
Solution 11
Solution 12
Solution 13
Solution 14
Solution 15
Solution 16
Sets Exercise Ex. 1.5
Solution 1
Solution 2(i)
Solution 2(ii)
Solution 2(iii)
Solution 2(iv)
Solution 2(v)
Solution 2(vi)
Solution 2(vii)
Solution 2(viii)
Solution 2(ix)
Solution 2(x)
Solution 3(i)
Solution 3(ii)
Solution 3(iii)
Solution 3(iv)
Solution 3(v)
Solution 3(vi)
Solution 4
Solution 5
Solution 6
Sets Exercise Ex. 1.8
Solution 1
Solution 2
Solution 3
Solution 4
Solution 5(i)
Solution 5(ii)
Solution 5(iii)
Solution 6
Solution 7
Solution 8
Solution 9
Solution 10
Solution 11
Solution 12
Solution 13
Solution 14
Solution 15
Sets Exercise Ex. 1VSAQ
Solution 1
Let A be a set. Then collection or family of all subsets of A is called the power set of A and is denoted by P(A).
A set having n elements has 2n subsets. Therefore, if A is a finite set having n elements, then P(A) has 2n elements.
Solution 2
If A is the void set Φ, then P(A) has just one element Φ i.e. P(Φ) ={Φ}.
Solution 3
Solution 4
The minimum number of elements thatcan have is 6.
Solution 5
Solution 6
Solution 7
The maximum number of elements thatcan have is 11.
Solution 8
Solution 9
Solution 10
Solution 11