To find the length of segment \( x \) using the provided information, we can set up a relationship based on the layout of the letters in the picture.
Given the values:
- \( y = 24 \)
- \( z = 5 \)
- \( b = 10 \)
If we assume the letters represent segments that can be added together or relate in a mathematical way, we can make some assumptions. However, since we do not have a specific equation format given in the problem, we'll consider a possible linear relation that might exist based on a geometric or algebraic combination.
A common approach is to think about a total length scenario or a simple addition or rules that combine the letters. Without the specific graphic context of how these letters relate, we will take the most basic algebraic approach based on combinations.
Let's suppose an equation that sums some or all of these lengths gives a segment we need to find:
Let's assume a relation such as: \[ x + z = y + b \]
Substituting the values: \[ x + 5 = 24 + 10 \] \[ x + 5 = 34 \]
Now subtract 5 from both sides: \[ x = 34 - 5 \] \[ x = 29 \]
Thus, based on this assumption, the value of \( x \) would be \( 29 \).
The correct response from the provided options is:
29.