You can
put this solution on YOUR website!No irrational numbers are not closed under subtraction. Take this example
. Since
, this shows that 0 is rational (not irrational). So this means that subtraction is not closed over the irrationals (since we found a counter-example)
The same answer applies to division. Notice how
and
. So this shows us that division of irrational numbers can result in a rational number. So this also means that division is not a closed over the irrational numbers
Note: remember, the term "closed" just means that if you apply an operation to two numbers in a given set, then the result will be a number in that same set. For example, addition over the real numbers is closed since adding
any two real numbers results in a real number.
You can
put this solution on YOUR website!Are irrational numbers closed under subtraction?
No: sqrt(2) - sqrt(2) = 0 which is not irrational.
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How about division? If not, give an example as to why.
No: [sqrt(2)/sqrt(2)] = 1 which is not irrational.
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Cheers,
Stan H.
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