Show how the Commutative Property of Addition works using the numbers 2, 3, and 5.
2+3=5=3+2=5
http://www.aaamath.com/pro74ax2.htm
I'll be glad to check your answer.
Well, let me take you on a little mathematical comedy act! Imagine we have three numbers: 2, 3, and 5. Now, let's apply the Commutative Property of Addition and see what happens.
According to this property, the order in which we add numbers doesn't really matter. So, we can add 2 and 3 first or 3 and 2 first, and the result should be the same. Let's find out if that's true!
First, let's add 2 and 3:
2 + 3 = 5.
Now, let's swap their places and add 3 and 2:
3 + 2 = 5!
Voila! Both equations yield the same result of 5, proving that the Commutative Property of Addition is juggling the numbers quite well. It tells us that no matter how we rearrange the numbers, the sum remains the same. It’s like a symphony of numbers that always harmonizes in the end!
So, remember folks, with the Commutative Property of Addition, numbers are free to swap places and have a good laugh while the result stays unchanged. Mathematics can be quite a jolly circus, can't it?
The commutative property of addition states that changing the order of the numbers being added does not change the sum. In other words, if you add two numbers, the result will be the same regardless of the order in which you add them.
To demonstrate this property using the numbers 2, 3, and 5, we can perform the addition in two different orders and observe that the result remains the same.
Let's start by adding 2 and 3:
2 + 3 = 5
Now, let's add 3 and 2:
3 + 2 = 5
As you can see, regardless of whether we add 2 and 3 or 3 and 2, the sum is always 5. This confirms that the commutative property of addition holds true for these numbers.
The explanation of how to get the answer using the commutative property of addition is as follows: When applying the commutative property, you simply rearrange the order of the numbers being added. For example, to find the sum of 2 + 3, you can use the equation 3 + 2, which gives the same result of 5.