To determine the correct equation that corresponds to the diagram, we need to analyze the components given.
From your description, it seems like you have four instances of \(x + 3\) that are possibly being added together or related in some way to the number 108.
Here's how you might break that down:
If you have four instances of \(x + 3\), it can be expressed as: \[ 4(x + 3) \] This would represent the sum of four \(x + 3\) terms.
If this is supposed to equal 108, you can set up the equation: \[ 4(x + 3) = 108 \]
Thus, rewriting the equation gives: \[ 108 = 4(x + 3) \]
Among the multiple choice answers you've provided, the correct equation that corresponds to the description would be: \[ 108 = 4(x + 3) \]
So, the answer is: 108 = 4(x + 3).