Explain closure property of subtraction of integers, with variables x and y. |
Closure Property of subtraction of integers says that
"Subtraction of Integers will also result in Integer".
So when variables x and y; applied to closure property of
subtraction of integers, we get
If variables x and y are integers then (x - y) is also an
integer.
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Related Question Examples
Explain closure property of subtraction of integers, with variables x and y. |
Prove Closure property of subtraction of integers, with integers x = 24, y = 89. |
Prove, if a and b are integers, then (a - b) will also be an integer. |
Observe the following table.
10 | - | 9 | = | 1 | It's a positive integers | -67 | - | 90 | = | ?? | ?? | -100 | - | -245 | = | ?? | ?? | 85 | - | -543 | = | ?? | ?? | 23 | - | 54 | = | ?? | ?? | |
First row is solved; try solving all the other rows in similar manner.
What do you understand by studying the entire table?
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Prove Closure property of subtraction of integers, with the help of two positive integers. |
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