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Published byPhilip McCoy Modified over 6 years ago
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Warm - up Draw the following and create your own intersection
Line AB and line t intersecting Plane Q and line XY intersecting Plane K and plane M intersecting ***THERE ARE PAPERS TO PASS BACK! PASS THEM OUT FOR EXTRA CREDIT
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1.4 ANGLES
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An angle is a geometric figure that consists of two rays that share a common endpoint.
The two rays are called the sides of the angle. The common endpoint of the two rays is called the vertex of the angle
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Naming an Angle A 1 B C L ABC or L CBA OR L B or L 1
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This confusing… A B C D Can we use just the vertex to name these angles?
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How many angles are there?
1 B 3 C 2 D
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Name the vertex of 3 State another name for 3 State another name for 1
B E D C 2 3 4 5 6 7 8 9 1
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HOW DO WE USE A PROTRACTOR?
Angle Measurements We measure the size of an angle using degrees. We measure the size of an angle using a protractor HOW DO WE USE A PROTRACTOR?
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Questions
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This angle measures 90 degrees. It is a right angle.
A right angle is an angle measuring exactly 90 degrees. This angle measures 90 degrees. It is a right angle. You use a protractor to measure angles.
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Acute Angle An acute angle is an angle measuring
between 0 and 90 degrees. This angle is less than 90 degrees. It is called an acute angle. “Ohhhh look at how a cute the little angle is…..”
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Obtuse Angle An obtuse angle is an angle measuring
between 90 and 180 degrees. This angle is greater than 90 degrees. It is called an obtuse angle.
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Straight Angle A straight angle is 180 degrees. A straight angle
Is a straight _____?
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Congruent Angles Angles that have equal measure
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Definition: Adjacent Angles
Two angles in a plane that have.. a common vertex and a common side but no common interior points. Common Side No Common interior Points Common Vertex
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T – Adjacent F – Not adjacent
2 1
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T – Adjacent F – Not adjacent
2 1
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T – Adjacent F – Not adjacent
1 2
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T – Adjacent F – Not adjacent
1 2
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Something that is going to cut directly through the midpoint
Bisector of a segment A line, segment, ray or plane that intersects the segment at its midpoint. A B P 3 Something that is going to cut directly through the midpoint
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Definition: Angle Bisector
The ray that divides an angle into two congruent adjacent angles B BX bisects L ABC Name the two congruent angles C X A
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Angle Addition Postulate
If point B lies in the interior of AOC, then m AOB + m BOC = m AOC. What is the interior of an angle? If AOC is a straight angle and B is any point not on AC, then m AOB + m BOC = 180. Why does it add up to 180? When explaining what the interior of an angle is, tell them that it is from 0 to the measure of the angle. Once you get to 180 degrees then there is no interior. You can make measurements from either side of the angle because it is straight
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Assumptions There are certain things that you can conclude from a diagram and others that you can’t.
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What can you Assume? A D Be Careful B E C
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What you can Assume? All points shown are coplanar
A, B, C are collinear B is between A and C ABC is a straight angle D is in the interior of ABE ABD and DBE are adjacent angles. A D B E C
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What you can’t Assume? AB BC ABD DBE CBE is a right angle A D B
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Marks are used to indicate conclusions about size in a diagram.
Arc marks – indicate congruent angles A D Tick marks – indicate congruent segments B E Indicates a 90 degree angle Marks are used to indicate conclusions about size in a diagram. C
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Lessons Learned… Don’t Assume !
Follow this rule: You can draw conclusions about position, but not about size. Use markings to help you find out information about the diagram
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State another name for 6 State another name for 2
Name the right angle State another name for 6 State another name for 2 State another name for 9 Name the angle adjacent to 4 that is not 3 A B E D C 2 3 4 5 6 7 8 9 1
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