In the figure, AB II CD and BC II AE. Let LABD measure (3x + 4)º, LBCD measure (6x - 8)°, and LEDF measure (7x - 20)°. C B D A What is the degree measure that completes the equation shown? E

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### Geometry Angle Problem #### Problem Statement 1. In the figure, \( \overline{AB} \parallel \overline{CD} \) and \( \overline{BC} \parallel \overline{AE} \). Let \( \angle ABD \) measure \( (3x + 4)^\circ \), \( \angle BCD \) measure \( (6x - 8)^\circ \), and \( \angle EDF \) measure \( (7x - 20)^\circ \).  **Question:** What is the **degree measure** that completes the equation shown? #### Explanation: The diagram included in the problem consists of several lines intersecting to form angles in a geometric configuration. The parallel lines and the angles involved need to be considered to solve for \( x \). Here's the breakdown of what's given: - \( \overline{AB} \parallel \overline{CD} \) - \( \overline{BC} \parallel \overline{AE} \) - \( \angle ABD = (3x + 4)^\circ \) - \( \angle BCD = (6x - 8)^\circ \) - \( \angle EDF = (7x - 20)^\circ \) To solve for \( x \), observe the relationships and properties of angles formed by parallel lines and transversals, such as alternate interior angles and corresponding angles. #### Steps and Solution 1. Use the properties of parallel lines and transversals to establish relationships between the angles. 2. Set up an equation based on the given angle measures. 3. Solve for \( x \). Each of these steps requires understanding the geometric properties and applying algebra to find the measure of \( x \). This problem is a typical example used to practice solving for unknown variables in geometric configurations involving parallel lines and angles. For further detail, you may explore parallel line geometry, angle relationships, and algebraic manipulation to reach the final degree measure.