2. If m<1=43, what is m <4?

53
43******
37
27

3. If m <1=43, what is m <5?
50****
40
35
25

<=the angle sign

Unfortunately i can not link the graph. But it is horizontal and a vertical crossing line then a diagonal line drawn through each right angle mke by the first two lines.

Sorry not fully understanding your description, however, I can guide you through this.

Vertical angles are congruent. I do not know how <4 and <5 are related you will have to explain.

Hard to say, but if lines split a 90 degree angle, all the small angles have to add up to 90 degrees.

To determine the value of m <4 and m <5 based on the given information, we need to understand the pattern and relationship between the angles.

From the graphic description provided (horizontal and vertical crossing lines with a diagonal line drawn through each right angle), it seems like we are dealing with a transversal line intersecting two parallel lines. This is known as a transversal intersecting parallel lines.

In this case, the given angles are represented as m<1, m<4, and m<5.

When a transversal line intersects two parallel lines, it creates several pairs of corresponding angles, alternate interior angles, and alternate exterior angles. These angle relationships are consistent and can help us find the missing values.

In this scenario, if m<1 is equal to 43, we can determine the values of m<4 and m<5 using the corresponding angles formed by the transversal line.

- Corresponding angles: Corresponding angles are formed when a transversal passes through two parallel lines, on the same side of the transversal, and at the matching positions. Corresponding angles are equal.

Therefore, since m<1 = 43, we can conclude that m<4 is also equal to 43.

- Alternate interior angles: Alternate interior angles are formed when a transversal line intersects two parallel lines, and they are on opposite sides of the transversal and inside the two parallel lines. Alternate interior angles are equal.

Since we don't have any information about the other angles involved in the transversal, we cannot determine the specific value of m<5. However, we know that m<5 is equal to the corresponding angle of m<1, which means it is also equal to 43.

To summarize:
- m<4 = 43
- m<5 = 43

Therefore, for the given graphic, the values of m<4 and m<5 are both 43.