mrs. hefty geometry: chpt. 1 notes geometry: 1-1 …phsmath.pbworks.com/w/file/fetch/44269420/2011...
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Mrs. Hefty Geometry: Chpt. 1 notes
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Geometry: 1-1 Points, Lines and Planes
What are the Undefined Terms?
The Undefined Terms are:
What is a Point?
How is a point named?
Example:
What is a Line?
A line is named two ways. What are the two ways?
Give an example of each:
What is a Plane?
There are two ways to name a line. What are the two ways?
Give an example of each.
Define Collinear:
Define Noncollinear:
Mrs. Hefty Geometry: Chpt. 1 notes
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Define intersection:
Exercises 1. Draw and Label a point, line and plane.
Refer to the figure.
2. Name the intersection of plane N and line AE.
3. Name the intersection of BC and DC.
4. Does DC intersect AE? Explain.
Refer to the figure.
5. Name the three line segments that intersect at point A.
6. Name the line of intersection of planes GAB and FEH.
7. Do planes GFE and HBC intersect? Explain.
8. Are G, D and B coplanar?
9. Are F, H, and A coplanar?
10. Are F, H and B coplanar?
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Describe what you see in as many ways as you can.
1.
2.
3. Plane N contains line b.
4. Planes R and S intersect at line MN.
5. A, B, and C do not intersect.
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Geometry: 1-2 Linear Measure
What is the difference between a line and a line segment?
Define congruent:
What is the congruent symbol?
How are congruent segments labeled in a figure?
Segment Addition Postulate
Exercises
1. Find the value of x and KL if K is between J and L.
JK = 2x, KL = x + 2, and JL = 5x – 10
2. Find the value of x and YZ if Y is between X and Z.
XY = 2x + 1, YZ = 6x, and XZ = 81
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3. Find the value of x and JL if K is between J and L.
JK=x2 – 21x, KL= 2x , and JL= 60.
4. Point B is between A and C. If AB= x2 + 2x , AC= 13x - 2 and
BC= 46. Find the value of x.
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Geometry: 1-3 Distance and Midpoint
Use the number line to find the distance of AB
Use the coordinate plane to find
the distance of KL K (-2, 10), L(-4, 3)
There are two ways.
1. Make a right triangle
2. Use the distance formula
Without a coordinate plane find the distance of EF E(-12, 2), F(-9, 6)
Define Midpoint:
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Use the number line to find the coordinate of the midpoint of each
segment. CE
Find the coordinates of the midpoint
of EF where E (-2, 6), F (-9, 3)
Find the coordinates of the missing
endpoint if E is the midpoint of DF where D(-3, -8), E(1, -2)
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Geometry: 1-4 (day 1) Angle Measure
Use your book to complete the following
Define Ray:
How is a ray named? Give an example
Define Opposite Ray:
Draw a picture of opposite rays and name the two rays.
Define angle:
Draw an angle and then identify it’s parts.
Angles are measure in units called ______________
Name the ways to classify the angles, define them and draw a picture.
Exercises
Refer to the figure at the right.
1. Name the vertex of ∠4.
2. Name the sides of ∠BDC.
3. Write another name for ∠DBC.
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Geometry: 1-4 (day 2) Angle Measure
Complete the sketch in geometer’s sketchpad. Angle Addition Postulate Sketch
1. Draw an angle
2. Measure each angle my selecting the three points in order that you
would say them if you were naming it. Go to measure, angle. Drag the
measurement by the angle.
3. Draw a ray that is on the interior of the angle by using the line
segment tool.
4. Measure the two angles that are created. Remember to select the
points in order that you would use when naming it. Place the
measurement by the angles.
5. Add the two smaller angles together by going to measure, calculate.
Click on one of the measures, click the add symbol on the calculator,
click on the other measure. Click okay.
6. What do you notice about the sum of those two measures compared to
the original?
Angle Bisector Sketch- Start a new sketch
1. Draw an angle
2. Measure each angle my selecting the three points in order that you
would say them if you were naming it. Go to measure, angle. Drag the
measurement by the angle.
3. Create an angle bisector by selecting the point in order that you would
name the angle, go to construct, angle bisector.
4. Measure the two angles that are created. Remember to select the
points in order that you would use when naming it. Place the
measurement by the angles.
5. What do you notice?
6. What does it mean to bisect an angle?
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Exercises
1. In the figure BA and BC are opposite rays. BF bisects ∠CBE.
If m∠EBF = 6x + 4 and m∠CBF = 7x - 2, find m∠EBF.
2. In the figure BA and BC are opposite rays. BF bisects ∠CBE.
Let m∠1 = m∠2. If m∠ABE = 100 and m∠ABD = 2(r + 5), find r and
m∠DBE
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Geometry: 1-5 (day 1) Angle Relationship
Complete the following Chart using your book
Special Angle Pairs Adjacent Angles
Definition
Example Nonexample
Linear Pair Definition
Example Nonexample
Vertical Angles
Definition
Example Nonexample
Define Complementary angles and draw examples
Define Supplementary angles and draw 2 different examples
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What is the difference between linear pair angles and supplementary
angles?
Define Perpendicular lines
What is the symbol that represents perpendicular?
Draw two lines that are perpendicular. What would you do to the
picture to communicate to others that the lines are perpendicular?
Excercises
Name an angle or angle pair that satisfies each condition.
1. two adjacent angles
2. two acute vertical angles
3. two supplementary adjacent angles
4. an angle supplementary to ∠RTS
For Exercises 5–7, use the figure at the right.
5. Identify two obtuse vertical angles.
6. Identify two acute adjacent angles.
7. Identify an angle supplementary to ∠TNU.
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Geometry: 1-5 (day 2) Angle Relationship
Vertical angle are two nonadjacent angles that are formed by two
intersecting lines.
Complete the sketch in geometer’s sketchpad Vertical angles sketch:
1. Using the line segment tool draw two line segments that intersect.
2. Measure all four angles. Remember to click on the point in the order
that you would name the angle. This is not necessarily alphabetically.
Move the measurements to the angle that they represent.
3. Look at the vertical angles. What do you notice about vertical
angles?
4. Using the calculator in sketchpad add two angle that are next to
each other. (if you don’t remember see sketch from 1-4 angle
addition postulate sketch step 5)
Exercises
1. Find the value of y, m∠RPT, and m∠TPW
2. Find the value of x and m∠CBA
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Geometry: 1-6 Two-Dimensional Figures
Define Polygon. Draw one and label the parts.
What is the difference between a concaved polygon and a convex
polygon?
Polygons can be classified by the sides. Complete the chart Number of
sides
Polygon Name Number
of sides
Polygon Name
3 9
4 10
5 11
6 12
7 13
8 14
9
Define Equilateral Polygon and draw one.
Define Regular Polygon and draw one.
A regular polygon with 3 sides is called_____________________
A regular polygon with four sides is called____________________.
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Exercises
Name each polygon by its number of sides. Then classify it as convex or
concave and regular or irregular.
Find the perimeter and area of the following.
Graph the following then find the perimeter and area.
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Geometry: 1-7 Three-Dimensional Figures
Using your book complete the following: Define Polyhedron What is a face of a polyhedron? What is an edge of a polyhedron? Write the name of each shape below it and determine if it is a polyhedron
Exercises Determine whether each solid is a polyhedron and complete the following
1 2.
Polyhedron? Polyhedron?
Faces? Faces? Edges? Edges? Vertices? Vertices?