Question

To clear out the fractions in the equation \( \frac{5}{6}y = x - \frac{25}{6} \), you did the right thing by multiplying through by 6. Let's work through your calculations step-by-step:

Original equation:
\[
\frac{5}{6}y = x - \frac{25}{6}
\]

Multiply both sides by 6:
\[
6 \cdot \frac{5}{6}y = 6 \cdot \left(x - \frac{25}{6}\right)
\]

This simplifies to:
\[
5y = 6x - 25
\]

Now, let's rearrange this to express \( y \) in terms of \( x \):
\[
5y = 6x - 25 \implies y = \frac{6}{5}x - 5
\]

You've correctly arrived at the equation \( y = \frac{6}{5}x - 5 \).

### Solving for \( y = 7 \)

Next, if we want to find what \( x \) is when \( y = 7 \), we can substitute \( y \) into the derived equation:
\[
7 = \frac{6}{5}x - 5
\]

Add 5 to both sides:
\[
7 + 5 = \frac{6}{5}x
\]
\[
12 = \frac{6}{5}x
\]

To isolate \( x \), multiply both sides by \( \frac{5}{6} \):
\[
x = 12 \cdot \frac{5}{6} = 10
\]

So when \( y = 7 \), \( x \) is indeed \( 10 \), confirming your previous conclusion.

In conclusion:
- The cleared-out form of your original equation is \( 5y = 6x - 25 \).
- The linear function relating \( y \) and \( x \) is \( y = \frac{6}{5}x - 5 \).
- Additionally, when \( y = 7 \), you confirmed \( x = 10 \).

No problem at all! Thank you for the clarification. Let's correct the approach accordingly, given that you need to show the relationship, confirming that when \( x = 10 \), \( y = 7 \).

Starting from the equation we derived:

\[
y = \frac{6}{5}x - 5
\]

Now, substitute \( x = 10 \) into this equation:

\[
y = \frac{6}{5}(10) - 5
\]

Calculating this step-by-step:

1. Calculate \( \frac{6}{5} \times 10 \):
\[
\frac{6 \times 10}{5} = \frac{60}{5} = 12
\]

2. Now, replace \( y \):
\[
y = 12 - 5 = 7
\]

So indeed, when \( x = 10 \), we find \( y = 7 \).

### Summary:
- Your derived linear equation is \( y = \frac{6}{5}x - 5 \).
- When you substitute \( x = 10 \) into this equation, you confirm that \( y = 7 \).

If you have any further questions or need additional assistance, feel free to ask!