Select the action you would use to solve x - 3 = 12. Then select the property

To solve the equation \( x - 3 = 12 \), you would select the following action:

A. Action: Add 3 to both sides.

Then, the justified property would be:

D. Property: Addition property of equality.

So, the correct selections are A and D.

Oh! THERES also an f :property:%20Subtraction%20property%20of%20equality ignore the 20% but is f one of them?

Yes, the Subtraction Property of Equality is relevant here as well. Here's how it applies:

When you have the equation \( x - 3 = 12 \), you can think of it as isolating \( x \) using subtraction. If you were to rearrange the equation:

1. You could subtract 12 from both sides to think about it as \( x - 3 = 12 \) and then converting it to another form.

However, this is less direct for the current equation. The preferred move from \( x - 3 = 12 \) is adding 3 to both sides (thus using the Addition Property of Equality, as previously mentioned).

Since F. Property: Subtraction property of equality does not apply directly to solving \( x - 3 = 12 \), it would not justify the action of adding 3. Thus, for this specific equation, A (adding 3) and D (Addition Property of Equality) are the best options without needing F.

In summary, for solving \( x - 3 = 12 \):

• A. Add 3 to both sides (correct action).
• D. Addition property of equality (justification for the action).

F is not an applicable justification for this particular equation.