Let A= {1, 2, {3, 4,}, 5}. Which of the following statements are incorrect and why?
(i) {3, 4}⊂ A
(ii) {3, 4}}∈ A
(iii) {{3, 4}}⊂ A
(iv) 1∈ A
(v) 1⊂ A
(vi) {1, 2, 5} ⊂ A
(vii) {1, 2, 5} ∈ A
(viii) {1, 2, 3} ⊂ A
(ix) Φ ∈ A
(x) Φ ⊂ A
(xi) {Φ} ⊂ A
Let A= {1, 2, {3, 4,}, 5}. Which of the following statements are incorrect and why?
(i) {3, 4}⊂ A
(ii) {3, 4}}∈ A
(iii) {{3, 4}}⊂ A
(iv) 1∈ A
(v) 1⊂ A
(vi) {1, 2, 5} ⊂ A
(vii) {1, 2, 5} ∈ A
(viii) {1, 2, 3} ⊂ A
(ix) Φ ∈ A
(x) Φ ⊂ A
(xi) {Φ} ⊂ A
A
= {1, 2, {3, 4}, 5}
(i) The
statement {3, 4} ⊂
A is incorrect because 3 ∈
{3, 4}; however, 3∉A.
(ii) The
statement {3, 4} ∈A
is correct because {3, 4} is an element of A.
(iii) The
statement {{3, 4}} ⊂
A is correct because {3, 4} ∈
{{3, 4}} and {3, 4} ∈
A.
(iv) The
statement 1∈A
is correct because 1 is an element of A.
(v) The
statement 1⊂
A is incorrect because an element of a set can never be a subset of
itself.
(vi) The
statement {1, 2, 5} ⊂
A is correct because each element of {1, 2, 5} is also an element of
A.
(vii) The
statement {1, 2, 5} ∈
A is incorrect because {1, 2, 5} is not an element of A.
(viii) The
statement {1, 2, 3} ⊂
A is incorrect because 3 ∈
{1, 2, 3}; however, 3 ∉
A.
(ix) The
statement Φ
∈
A is incorrect because Φ
is not an element of A.
(x) The
statement Φ
⊂
A is correct because Φ
is a subset of every set.
(xi) The
statement {Φ}
⊂
A is incorrect because Φ∈
{Φ};
however, Φ
∈
A.
A = {1, 2, {3, 4}, 5}
(i) The statement {3, 4} ⊂ A is incorrect because 3 ∈ {3, 4}; however, 3∉A.
(ii) The statement {3, 4} ∈A is correct because {3, 4} is an element of A.
(iii) The statement {{3, 4}} ⊂ A is correct because {3, 4} ∈ {{3, 4}} and {3, 4} ∈ A.
(iv) The statement 1∈A is correct because 1 is an element of A.
(v) The statement 1⊂ A is incorrect because an element of a set can never be a subset of itself.
(vi) The statement {1, 2, 5} ⊂ A is correct because each element of {1, 2, 5} is also an element of A.
(vii) The statement {1, 2, 5} ∈ A is incorrect because {1, 2, 5} is not an element of A.
(viii) The statement {1, 2, 3} ⊂ A is incorrect because 3 ∈ {1, 2, 3}; however, 3 ∉ A.
(ix) The statement Φ ∈ A is incorrect because Φ is not an element of A.
(x) The statement Φ ⊂ A is correct because Φ is a subset of every set.
(xi) The statement {Φ} ⊂ A is incorrect because Φ∈ {Φ}; however, Φ ∈ A.
