(13х - 6)°, (5x + 14)9 540 Find the value of a. = x

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**Problem Description:** In the given diagram, there is a circle with two intersecting lines extending outside of the circle. - The angle subtended by one of the intersecting lines inside the circle is labeled as \( (13x - 6)^\circ \). - The angle subtended by the other intersecting line inside the circle is labeled as \( (5x + 14)^\circ \). - The external angle created between the extensions of the intersecting lines is given as \( 54^\circ \). **Task:** Find the value of \( x \). **Equation Setup:** To solve for \( x \), we can use the property of angles outside a circle where the external angle is equal to half the difference of the intercepted arcs. This leads to the equation: \[ 54^\circ = \frac{1}{2} \left[ (13x - 6)^\circ - (5x + 14)^\circ \right] \] **Simplification:** First, simplify the expressions inside the parentheses: \[ 54^\circ = \frac{1}{2} \left[ 13x - 6 - 5x - 14 \right] \] \[ 54^\circ = \frac{1}{2} \left[ 8x - 20 \right] \] Multiply both sides by 2 to remove the fraction: \[ 108^\circ = 8x - 20 \] Next, solve for \( x \): \[ 108 + 20 = 8x \] \[ 128 = 8x \] \[ x = \frac{128}{8} \] \[ x = 16 \] **Answer:** The value of \( x \) is: \[ x = \boxed{16} \]