# Vertical Angles and Linear Pairs Worksheet Answers

Perpendicular angles and linear pairs worksheet answersKuta Software LLC worksheet. Responses to linear pair and vertical angle practice. PERPENDICULAR ANGLE AND LINEAR PAIRS. The vertical angles are not congruent. To answer each question, use the image on the right.

## Worksheet Vertical Angles and Linear Pairs

On " Worksheet Vertical Angles and Linear Pairs" Worksheet Vertical Angles and Linear Pairs: Worksheet given in this section is very useful for those student who want to practise having issues with different relations between angle pairs. Issue 1: View the image below and respond to the following question.

Then search for the angular dimensions. Issue 3: In the banister shown on the right, m? has a dimension of 130°. Locate the dimensions of the other three angles. Issue 1: View the image below and respond to the following question. Are m? and m a linear couple?

Are m? and m a linear couple? and m? are vertical angles? iv) Are m? and m? vertical angles? The angles are side by side, but their unusual sides are not opposite beams. Resolution (ii): Yes. Angles are side by side and their unusual sides are opposite beams.

The sides of the angles do not make two pairs of opposite beams. The sides of the angles do not make two pairs of opposite beams. Then search for the angular dimensions. Answer: Take advantage of the fact that the total of the dimensions of the angles forming a linear couple is 180°.

Solution for "x": m?AED and m?DEB are a linear couple. Thus, the total of their dimensions is 180°. Both sides by 4 part, solution for "y": m?AEC and m?CEB are a linear couple. Thus, the total of their dimensions is 180°. Split both sides by 5. Use 5. to find the angular dimensions:

The angular dimensions are 125°, 55°, 55°, 55° and 125°. Since the vertical angles are the same, the results are sensible. Issue 3: In the banister shown on the right, m? has a dimension of 130°. Locate the dimensions of the other three angles. Solutions: m and m are a linear couple.

Thus, the total of their dimensions is 180°. Then subtract 130 from both sides. m and m are also a linear couple. It follows that m? = 50°. m? and m? are vertical angles. So they are matching and have the same dimensions. Having gone through the above points, we sincerely hope our student will understand the worksheet "Vertical Angles and Linear Pairs".