

Intersecting Chords, Secants, and Tangents
Presentation
•
Mathematics
•
6th - 8th Grade
•
Hard
Joseph Anderson
FREE Resource
16 Slides • 4 Questions
1
Unit 12 Lesson 1 - Intersecting Chords, Secants and Tangents in Circles

3
Multiple Choice
Find the measure of the missing inscribed angle, x.
30º
60º
120º
15º
4
More Circle Vocabulary
5
There are 3 types of intersections that we will look at...
and the 3 different formulas associated with them.
6
Intersection #1 - Angle formed ON the circle
7
Intersection #1 - ON the circle
When two 'lines' intersect ON a circle, we see a few important relationships.
1. The angles formed are a linear pair (add to 180º).
2. The two arcs formed add to 360º.
3. The intercepted arcs of each angle are DOUBLE the measure of the angle.
8
Intersection #1 - ON the circle
When two 'lines' intersect ON a circle, we see a few important relationships.
1. The angles formed are a linear pair (add to 180º).
2. The two arcs formed add to 360º.
3. The intercepted arcs of each angle are DOUBLE the measure of the angle.
9
Intersection #1 - ON the circle
When two 'lines' intersect ON a circle, we see a few important relationships.
1. The angles formed are a linear pair (add to 180º).
2. The two arcs formed add to 360º.
3. The intercepted arcs of each angle are DOUBLE the measure of the angle.
10
Example
11
Multiple Choice
Find the measure of the missing angle.
40º
80º
160º
100º
12
Multiple Choice
Find the measure of the missing angle.
65º
115º
360º
180º
13
Intersection #2 - Angles formed INSIDE the circle
14
Intersection #2 - INSIDE the circle
When two 'lines' intersect INSIDE a circle, we have a few important relationships:
1. The angles formed are sets of linear pairs (1 + 2 = 180º).
*Note the vertical angles formed)*
2. All four arcs formed add to 360º.
3. The intercepted arcs on either side of each angle are ADDED, then HALVED.
15
Intersection #2 - INSIDE the circle
When two 'lines' intersect INSIDE a circle, we have a few important relationships:
1. The angles formed are sets of linear pairs (1 + 2 = 180º).
*Note the vertical angles formed)*
2. All four arcs formed add to 360º.
3. The intercepted arcs on either side of each angle are ADDED, then HALVED.
16
Intersection #2 - INSIDE the circle
When two 'lines' intersect INSIDE a circle, we have a few important relationships:
1. The angles formed are sets of linear pairs (1 + 2 = 180º).
*Note the vertical angles formed)*
2. All four arcs formed add to 360º.
3. The intercepted arcs on either side of each angle are ADDED, then HALVED.
17
Example
18
Poll
Which one best describes you for 4.2a?
I am confident in my ability to learn this topic.
I am unsure about my ability to learn this topic.
I am not optimistic about my ability to learn this topic.
20
That's it for now!
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Unit 12 Lesson 1 - Intersecting Chords, Secants and Tangents in Circles

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