To find the measurement of angle \( \angle EBC \), we will analyze the angle bisectors that Sam constructed.
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First, consider \(\angle ABC\):
- It measures \( 54^\circ \).
- Sam constructs the angle bisector \( \overline{BD} \), which divides \( \angle ABC \) into two equal parts.
- Therefore, each part measures: \[ \frac{54^\circ}{2} = 27^\circ \] So: \[ \angle ABD = 27^\circ \quad \text{and} \quad \angle DBC = 27^\circ \]
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Next, consider \(\angle DBC\):
- Sam now constructs the angle bisector \( \overline{BE} \) for \(\angle DBC\), which also measures \( 27^\circ \).
- Again, the angle bisector divides \( \angle DBC \) into two equal parts: \[ \frac{27^\circ}{2} = 13.5^\circ \] So: \[ \angle EBD = 13.5^\circ \quad \text{and} \quad \angle EBC = 13.5^\circ \]
Thus, the measurement of \( \angle EBC \) is:\[\boxed{13.5 \text{ degrees}}\]
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