Parallel lines and transversals

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Intros
Lessons
  1. Relationships between lines and angles
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Examples
Lessons
  1. Find the missing values and then explain your reasoning.
    missing values in angles
    1. 6\angle 6 \cong ?
    2. 2\angle 2 \cong ?
    3. if m 8\angle 8 = 60°, m 1\angle 1 = ?
    4. 3\angle 3 and ?\angle ? Are supplementary
  2. Find the value of x.

    1. find missing angles 1

    2. find missing angles 2

    3. find missing angles 3
  3. Write a two-column proof.
    Given: AB\overline {AB} \parallel CD\overline {CD}
    Prove: 1\angle 1 \cong 2\angle 2
    angles two-column proof
    Topic Notes
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    Parallel lines

    What are parallel lines? They are lines that are equidistant (the same distance apart) from each other but never meet. They also point in the same direction.

    When a set of parallel lines gets cut by another line, that other line is called a transversal. Having this transversal line paves the way for a variety of helpful information that we can derive from the parallel lines' angles.

    What are corresponding angles

    When we've got a line with a transversal through it, we can identify corresponding angles from the two parallel lines that are the same. Therefore, corresponding angles are equal. This is the corresponding angles definition. We'll have a chart below to summarize this and the following concept at the end with visual depictions of what these terms mean.

    What are alternate interior angles

    Alternate interior angles are found on the opposite sides of the transversal but inside the two lines. These angles are on the interior of the lines that cross, but on alternate sides of the transversal. This is the alternate interior angles definition.

    Here's a summary chart of the above concepts, plus a few more pairs of angles that come about due to parallel lines and a transversal. Unlike regular pairs of lines and angles, these ones have special rules to their angles based off the parallel lines. They'll be very useful in helping you solve questions related to pairs of angles.

    Example questions

    Question 1:

    Find the missing values and then explain your reasoning.

    a) angle 6 \cong ?

    b) angle 2 \cong ?

    c) if m angle 8 = 60°, m angle 1 = ?

    d) angle 3 and angle ? are supplementary

    Solutions:

    a) angle 6 \cong ?

    Angle 6 is congruent to angle 2 due to the corresponding angle rule.

    Angle 6 is also congruent to angle 7 due to vertical angle congruence.

    Lastly, angle 6 is congruent to angle 3 because of the corresponding angle rule between angle 3 and angle 7.

    b) angle 2 \cong ?

    Angle 2 is equalled to angle 6 since they're corresponding angles.

    Angle 2 is also congruent to angle 3 due to vertical angle congruence.

    Lastly, angle 2 is congruent to angle 7 based on the corresponding angle rule or alternate exterior angle theorem.

    c) if m angle 8 = 60°, m angle 1 = ?

    We get that m angle 1 = 60°. This is based on the alternate exterior angle theorem.

    d) angle 3 and angle ? are supplementary

    Supplementary means that the sum the two angles = 180°

    So angle 3 + angle 5 is supplementary due to the consecutive interior angle theorem.

    In addition, angle 8, angle 1, angle 4 are also supplementary to angle 3.

    Question 2:

    Find the value of x.

    Solution:

    Angle 130° = 2x°

    So,

    130 = 2x

    65° = x

    Question 3:

    Write a two-column proof.

    Given: AB||CD

    Prove: angle 1 \cong angle 2

    Solution:

    Statements

    reasons

    AB||CD

    given

    angle 3 \cong angle 1

    Vertical angle congruence theorem

    angle 3 \cong angle 2

    Corresponding angle postulate

    angle 1 \cong angle 2

    Transitive property of congruence

    Take a look at this interactive online diagram to help you see the angle relationships that exist when there is a set of parallel lines and a transversal.

    To move further into this concept, learn more about parallel line equation and how to deal with a combination of parallel and perpendicular line equations.

    Basic Concepts
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