Which property is illustrated by the following statement

(3z)xy=3(zx)y
Associative property of multiplication
Communative property of Multiplication
Inverse property of multiplication
Communative of Addition
My answer is commnative property of addition am I right?

I know this is late but it's a test, answers will change so it's best to get answers 1 by 1 rather than a list of answers.

Nope. Associative.

Commutative would be something line

(3z)xy = xy(3z) = (3z)yx

where two multiplicands are swapped.

hes cap

Like how someone said it is better to just do 1 question by 1 if you do an entire thing of answers it is just going to be wrong just do 1 by 1 or just study or well whatever just to let you know there is a study guide that has 21 questions that will give videos on how to answer them and everything so don't just guess and fail. Well, I hope this helps have fun and try your best bye also yes I know I forgot to put periods and stuff I don't care.

Is this right

communicative property of multiplication

No, your answer is not correct. The property illustrated by the statement (3z)xy = 3(zx)y is the Commutative Property of Multiplication.

The Commutative Property of Multiplication states that when multiplying numbers, the order of the factors does not affect the result. In other words, you can multiply the numbers in any order and still get the same product.

To identify the property used in the given statement, we can understand it step by step:

(3z)xy = 3(zx)y

Here, we have the factors 3z, x, and y being multiplied together. According to the Commutative Property of Multiplication, we can rearrange these factors without changing the result. In this case, we are switching the order of z and x, so we have zx instead of xz.

Therefore, the correct answer is the Commutative Property of Multiplication, not the Commutative Property of Addition.

does anyone have all of the answers?

1 C

2 B
3 A
4 B
5 D
6 C
7 D
8 B
9 C
10 B
11 D
12 B
13 A
14 A
15 A
16 A
17 B
18 D
19 C
20 A
21 C
22 D
23 B
24 A
25 D
26 A C D
27 D
28 did not answer to lazy to try
29 same with 28