QUESTION IMAGE
Question
- two parallel lines ( l ) and ( m ) are cut by a transversal, forming angles ( (18x - 44)^circ ), ( (8x - 10)^circ ), and ( (13y - 38)^circ ) as shown in the diagram.
Step1: Identify the relationship between angles
Since lines \( l \) and \( m \) are parallel (implied by the transversal and the angle positions), the two angles \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are same - side interior angles? Wait, no, actually, looking at the diagram, \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are supplementary? Wait, no, maybe they are alternate - interior or corresponding? Wait, no, actually, if we consider the two angles \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \), since lines \( l \) and \( m \) are parallel, and the transversal cuts them, the angle \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are same - side interior angles? Wait, no, maybe I made a mistake. Wait, actually, the angle \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are supplementary? Wait, no, let's think again. Wait, the two angles \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are actually same - side interior angles? No, maybe they are alternate - exterior? Wait, no, the correct approach: since lines \( l \) and \( m \) are parallel, the angle \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are supplementary? Wait, no, let's check the positions. Wait, the angle \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are on the same side of the transversal and inside the two parallel lines, so they are same - side interior angles, which are supplementary. So:
\( (18x - 44)+(8x - 10)=180 \)
Step2: Solve for \( x \)
Combine like terms:
\( 18x+8x-44 - 10 = 180 \)
\( 26x-54 = 180 \)
Add 54 to both sides:
\( 26x=180 + 54 \)
\( 26x=234 \)
Divide both sides by 26:
\( x=\frac{234}{26}=9 \)
Step3: Find the measure of the angle \( (8x - 10)^\circ \)
Substitute \( x = 9 \) into \( 8x-10 \):
\( 8\times9-10=72 - 10 = 62^\circ \)
Step4: Solve for \( y \)
Now, the angle \( (8x - 10)^\circ=62^\circ \) and the angle \( (13y - 38)^\circ \) are vertical angles (or corresponding angles, since lines are parallel), so they are equal. So:
\( 13y-38 = 62 \)
Add 38 to both sides:
\( 13y=62 + 38 \)
\( 13y=100 \)? Wait, no, wait, maybe the angle \( (8x - 10)^\circ \) and \( (13y - 38)^\circ \) are supplementary? Wait, no, let's re - examine the diagram. Wait, the angle \( (8x - 10)^\circ \) and \( (13y - 38)^\circ \) are actually alternate - interior angles? No, maybe the angle \( (8x - 10)^\circ \) and \( (13y - 38)^\circ \) are equal because they are vertical angles or corresponding angles. Wait, when \( x = 9 \), \( 18x-44=18\times9 - 44=162 - 44 = 118^\circ \), and \( 8x - 10=62^\circ \), and the angle \( (13y - 38)^\circ \) should be equal to \( (8x - 10)^\circ \) if they are vertical angles. So:
\( 13y-38=62 \)
\( 13y=62 + 38=100 \)
\( y=\frac{100}{13}\approx7.69 \)? Wait, that can't be right. Wait, maybe I made a mistake in the angle relationship. Let's start over.
Wait, the two angles \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \): since lines \( l \) and \( m \) are parallel, and the transversal cuts them, the angle \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are actually alternate - interior angles? No, alternate - interior angles are equal. Wait, maybe the diagram shows that \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are equal? Wait, that would make more sense. Let's try that.
If \( 18x-44 = 8x - 10 \)
Subtract \( 8x \) from both sides:
\( 10x-44=- 10 \)
Add 44 to both sides:
\( 10x=34 \)
\( x = 3.4 \), which is not an integer. So that's wrong.
Wait, maybe the angle \( (18x - 44)^\circ \) and \( (8x - 10)^\circ \) are supplementary. Let's check:
\( 18x-44+8x - 10=180 \)
\( 26x…
Snap & solve any problem in the app
Get step-by-step solutions on Sovi AI
Photo-based solutions with guided steps
Explore more problems and detailed explanations
If we were to find \( x \) and \( y \), \( x = 9 \) and \( y = 12 \)