CBSE Class 12 Mathematics Chapter wise Past year questions

23
Relation · a ≤ b²

Check whether the relation S in the set of all real numbers (R) defined by
S = {(a, b) : a ≤ b²} is reflexive, symmetric or transitive. Also, determine all x ∈ R such that (x, x) ∈ S.

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Reflexive :

(½, ½) ∉ S because ½ ≤ (½)² is false. ∴ not reflexive.

Symmetric :

(–1, 3) ∈ S but (3, –1) ∉ S. ∴ not symmetric.

Transitive :

(1, –2) ∈ S and (–2, 0) ∈ S but (1, 0) ∉ S. ∴ not transitive.

(x, x) ∈ S :

x ≤ x² ⇒ x² – x ≥ 0 ⇒ x(x–1) ≥ 0 ⇒ x ∈ (–∞, 0] ∪ [1, ∞).
i.e. x ∈ R – (0, 1).

24
Relation · a ≤ b³

Check whether the relation S in the set of all real numbers (R) defined by
S = {(a, b) : a ≤ b³} is reflexive, symmetric or transitive.

📖 Show Answer

Reflexive :

(½, ½) ∉ S because ½ ≤ (½)³ is false. ∴ not reflexive.

Symmetric :

(–1, 3) ∈ S but (3, –1) ∉ S. ∴ not symmetric.

Transitive :

(3, 3/2) ∈ S and (3/2, 4/3) ∈ S but (3, 4/3) ∉ S. ∴ not transitive.

25
Equivalence Relation · 2 Divides (a+b)

Prove that the relation R in the set of integers Z defined as
R = {(a, b): 2 divides (a+b)} is an equivalence relation. Also, determine [3].

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Reflexive :

a+a = 2a is divisible by 2 ⇒ (a,a) ∈ R. ∴ reflexive.

Symmetric :

If 2 divides a+b, then 2 divides b+a ⇒ (b,a) ∈ R. ∴ symmetric.

Transitive :

If a+b and b+c are even, then a and b have same parity, b and c have same parity ⇒ a and c have same parity ⇒ a+c is even. ∴ transitive.

[3] :

[3] = {…, –3, –1, 1, 3, 5, …} i.e. all odd integers.