m<2= 34°. Find m<4 and explain how you know.
To find m<4, we need more information about the relationship between angles. Without this information, we cannot determine the measure of angle 4.
To find m<4, we need additional information about the relationship between angles. Without this information, we cannot determine the measure of angle 4.
To find m<4, we need to consider the angles formed by intersecting lines or parallel lines. It is important to note that we do not have any direct information or relationships between m<2 and m<4.
Given that m<2 is 34°, it seems like m<2 and m<4 are vertically opposite angles. Vertically opposite angles are formed when two lines intersect each other. In this case, it would mean that m<2 and m<4 are opposite each other and have the same measure. So, we can conclude that m<4 is also 34°.
To understand this better, let's consider the geometric properties involved. When two lines intersect, they form four pairs of vertically opposite angles. These angles are across from each other and have the same measure.
In this case, we are given the measure of one of the vertically opposite angles, which is m<2. Since vertically opposite angles have the same measure, we can conclude that m<4 also has a measure of 34°.
So, to find m<4, we use the property of vertically opposite angles and conclude that it is 34°, just like m<2.