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