Question

there does not exist the largest whole number. give examples in support of this statement​

Answer 1

Step-by-step explanation:

let's assume that there is a largest Natural or whole number which is x

Now we know that we can add or subtract or multiply or divide any WHOLE number or NATURAL

So let's add 1 to the largest Natural or whole number which is x as Natural numbers(N) or whole numbers(W) follow closed property under addition, i.e IF a,b are N or W then a + b = c where c is also a N or W

∴x + 1

∵x+1 > x

∴The new largest N or W is x+1

Now we can repeat this process endlessly, which means that the largest N or W doesn't exist

HENCE PROVED...

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Answer 2

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