0 votes
113 views
in Chapter 1 Relations and Functions by (8.1k points)
edited
State whether the following statements are true or false. Justify.

(i) For any arbitrary binary operation * on a set N,

a * a = a ∀a ∈ N.

(ii) If * is commutative binary operation on N, then a * (b * c) = (c * b) * a.

1 Answer

0 votes
by (8.1k points)
selected by
 
Best answer
(i) A binary operation on N is defined as
a * a = a ∀a ∈ N.
Here, operation * is not defined.
∴ Given statement is false.

(ii) * is a binary commutative operation on N.
⇒ c * b = b * c [∵ * is commutative]
∴ (c * b) * a = (b * c) * a = a * (b * c)
∴ a * (b * c) = (c * b) * a.
∴ This statement is true.

Related questions

Doubtly is an online community for engineering students, offering:

  • Free viva questions PDFs
  • Previous year question papers (PYQs)
  • Academic doubt solutions
  • Expert-guided solutions

Get the pro version for free by logging in!

5.7k questions

5.1k answers

108 comments

557 users

...