1 to the power of one divided equals 2 which is commutative
A counterexample for the division of whole numbers is if we have 6 apples and we try to divide them equally among 4 people. Each person would get 1 apple and there would be 2 apples remaining. In this case, it is not possible to divide the apples equally among 4 people without leaving any remainder.
1/2 = 0.52/1 = 2 0.5 is not equal to 2.
There is no counterexample because the set of whole numbers is closed under addition (and subtraction).
No, the result of a division of one whole number into another might be a whole number, but could also be a fraction.
Counterexample
A counterexample.
(8/4)/2=1 8/(4/2)=4
1/2 = 0.52/1 = 2 0.5 is not equal to 2.
There is no counterexample because the set of whole numbers is closed under addition (and subtraction).
Division by 0, which can also be written as 0.000... (repeating) is not defined.
One example is 2 divided by 4 is not a whole number
No. Not if it is a true statement. Identities and tautologies cannot have a counterexample.
-16
8 divided by 2 does not equal 2 divided by 8. 8/2=4...2/8=0.25
No, the result of a division of one whole number into another might be a whole number, but could also be a fraction.
You can give hundreds of examples, but a single counterexample shows that natural numbers are NOT closed under subtraction or division. For example, 1 - 2 is NOT a natural number, and 1 / 2 is NOT a natural number.
Counterexample
A counterexample.