Write an equation in the form px+q=r to represent this problem.

To create an equation in the form \( px + q = r \), we can fill in the blanks with appropriate values. Here’s a simple example:

Let's say we want to use \( 3 \) for \( q \) and \( 7 \) for \( r \). The equation would be:

\[ x + 3 = 7 \]

Now, we can identify the values for \( p \), \( q \), and \( r \):

• \( p = 1 \) (the coefficient of \( x \))
• \( q = 3 \)
• \( r = 7 \)

Thus, the final equation in the form \( px + q = r \) is:

\[ 1x + 3 = 7 \]

wrong

I apologize for the oversight. Let’s clarify your request and correctly create an equation in the specified form \( px + q = r \).

You started the equation as \( x + \) = \( \). Let's fill in the blanks with realistic numbers. I'll set:

• \( q = 5 \)
• \( r = 12 \)

Then, we would have the equation:

\[ x + 5 = 12 \]

In this case, the values are:

• \( p = 1 \) (the coefficient of \( x \))
• \( q = 5 \)
• \( r = 12 \)

This satisfies the format you provided. If you have specific numbers or additional constraints in mind for \( q \) or \( r \), please provide them, and I'll adjust accordingly!