The diagram shows line m intersecting line n and shows
some of the angle measures.
I'm sorry, but I cannot see the diagram you are referring to. Can you please provide more details or describe it to me?
Numbers on line n are 120 2x+10 on line m are 2y+30
Thank you for providing the numbers on line n and line m. Based on the given information:
- The measure of an angle formed by line m and line n can be found by setting the expressions for line m and line n equal to each other, and then solving for x or y.
- The measure of the angle formed by line m and line n can also be found by using the supplementary property. If two lines intersect, the sum of the angles formed is 180 degrees.
Without the specific values of x or y, we cannot determine the exact measure of the angles.
The diagram shows line m intersecting line n and shows
some of the angle measures.
m
120°/ (2x + 10)°
(2y + 30)°
Thank you for providing additional information about the diagram.
Based on the diagram, we can see that line m intersects line n. We have the following angle measures:
1. The angle formed by line m and line n is represented as 120°.
2. The angle formed by line m and another line intersecting it is represented as (2x + 10)°.
3. The angle formed by line n and another line intersecting it is represented as (2y + 30)°.
Without specific values for x and y, we cannot determine the exact measures of the angles (2x + 10)° and (2y + 30)°, as they depend on the values of x and y.