Question

all counting numbers, Together with their negative and zeros constitute a set of? ​

Answer 1

Answer:

They are set of integers.

Answer 2

SOLUTION

TO DETERMINE

All counting numbers together with their negative and zeros constitute a set of

CONCEPT TO BE IMPLEMENTED

SET

A set is a well defined collection of distinct objects of our perception or of our thought to be conceived as a whole

Representation of Set :

A set can be represented in following ways

(i) Statement form method

(ii) Roster or tabular form method

(iii) Rule or set builder form method

EVALUATION

Here we have to find the set of all counting numbers together with their negative and zeros

We know that

Set of all natural numbers denoted by N and defined as

N = { 1 , 2 , 3 ,..}

Set of all integers is denoted by Z and defined as the set of all counting numbers together with their negative and zeros

$\sf{Z = \{0, \pm 1, \pm 2, \pm3 \: , ...\} }$

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