Question

name any one property which exists in all N,W, Z,Q​

Answer 1

Given : N,W,Z,&Q​

To find : Any one property which exist in all

Solution:

All real number properties will exist for N,W,Z,&Q​

N - Natural Numbers

W = Whole numbers

Z = integers

Q - Rational Numbers

N,W,Z,&Q​  all are  Subsets of Real Numbers    R

Any property which Exist in real number will exist in all of N,W,Z,&Q​

Property of Equality

if  a ∈ R   Then a =  a

a, b ∈ R   , if a = b then b = a

a , b  .c  ∈ R  , if a = b , b = c then a = c

Addition , multiplication

Associative , Commutative , Distributive property of Addition & multiplication

These All property exists in N,W,Z,&Q​