To demonstrate that Expression 1 is equivalent to Expression 2 using the Associative Property, we can rewrite both expressions and see if they simplify to the same result.

Question

To demonstrate that Expression 1 is equivalent to Expression 2 using the Associative Property, we can rewrite both expressions and see if they simplify to the same result.
### Expression 1:
$$ 22r - 13 $$

### Expression 2:
$$ 19r + (3r - 2) - 11 $$

First, let's simplify Expression 2 step by step.

1. Start with:
$$ 19r + (3r - 2) - 11 $$

2. Apply the Associative Property:
- The Associative Property states that the way numbers are grouped in addition does not change their sum. Therefore, we can add 3r to 19r first:
$$ (19r + 3r) - 2 - 11 $$

3. Simplifying $ 19r + 3r $:
$$ 22r - 2 - 11 $$

4. Now, combine the constant terms $-2$ and $-11$:
$$ 22r - 13 $$

Now we can see that both expressions are equivalent:
- Expression 1: $ 22r - 13 $
- Expression 2 simplified is also $ 22r - 13 $

Thus, by using the Associative Property and simplifying Expression 2, we have shown that Expression 1 is equivalent to Expression 2:

\[
\boxed{22r - 13}
makre it smal;ler

GPT-4o mini · Answer

To show that Expression 1 is equivalent to Expression 2 using the Associative Property, we can simplify both expressions.

Expression 1:

\[ 22r - 13 \]

Expression 2:

\[ 19r + (3r - 2) - 11 \]

Let's simplify Expression 2 step by step.

Start with: \[ 19r + (3r - 2) - 11 \]
Use the Associative Property and group the terms: \[ 19r + 3r - 2 - 11 \]
Combine $ 19r $ and $ 3r $: \[ (19r + 3r) - 2 - 11 \] \[ 22r - 2 - 11 \]
Combine the constants $-2$ and $-11$: \[ 22r - 13 \]

Now, we have both expressions:

Expression 1: $ 22r - 13 $
Expression 2 simplified to: $ 22r - 13 $

We have demonstrated that:

\[ \boxed{22r - 13} \]

Both expressions are equivalent.