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To solve the equation \(\frac{x + 12}{1} = 9\), let’s break it down step by step:

1. We start with the equation:
\[
\frac{x + 12}{1} = 9
\]

2. Since dividing by 1 doesn’t really change anything, we can just write:
\[
x + 12 = 9
\]

3. Now, we want to find out what \(x\) is. To do that, we need to get \(x\) all by itself. So, we can subtract 12 from both sides. It looks like this:
\[
x + 12 - 12 = 9 - 12
\]

4. This simplifies down to:
\[
x = 9 - 12
\]

5. Now we do the math on the right side:
\[
9 - 12 = -3
\]

So, the answer we find for \(x\) is:
\[
x = -3
\]

That means the solution to our equation is:
\[
\boxed{-3}
\]
make this like a 6th grader wrote it

1 answer

Let's solve the equation \(\frac{x + 12}{1} = 9\) together step by step!

  1. First, we have the equation: \[ \frac{x + 12}{1} = 9 \]

  2. We notice that dividing something by 1 doesn’t change it at all, so we can just rewrite it like this: \[ x + 12 = 9 \]

  3. Now, we want to find the value of \(x\). To do that, we need to get \(x\) by itself. We can do this by subtracting 12 from both sides of the equation. Here’s how it looks: \[ x + 12 - 12 = 9 - 12 \]

  4. This simplifies down to: \[ x = 9 - 12 \]

  5. Now, let’s do the math on the right side: \[ 9 - 12 = -3 \]

So, we find that the value of \(x\) is: \[ x = -3 \]

This means the solution to our equation is: \[ \boxed{-3} \]

And that's how we solve it! Easy peasy!