polygons
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Polygons. Essential Question: Why is it important to understand the properties of two-dimensional figures, such as triangles and quadrilaterals?. Angle Relationships. Target: Classify and identify angles and find missing measures. Angle Definitions - PowerPoint PPT PresentationTRANSCRIPT
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PolygonsEssential Question:Why is it important to understand the properties of two-dimensional figures, such as triangles and quadrilaterals?
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Angle RelationshipsTarget:Classify and identify angles and find missing measures.
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Angle Definitions• An angle has two sides that share a common endpoint called a vertex.• Angles are measures in units called degrees.• How many degrees are in a circle?• Congruent angles have the same measure.
Naming Angles• Use the vertex as the middle letter and
a point from each side. The symbol for angle is .• LMN or NML
• Use only the vertex.• M
• Use a number.• 1
N
L
M 1
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Types of Angles
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• Name each angle in two different ways.• Classify each angle as acute, obtuse, right, or straight.
Angle Practice
ABCCBAB1
straight
MNOONM
N2
right
PQRRQPQ3
acute
STUUTST4
obtuse
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Pairs of Angles
Adjacent Angles are two angles that share a vertex and a common side and do not overlap.
Complementary Angles are two angles whose measures add up to 90.
v
Vertical Angles are angles formed when two lines intersect – two pairs of congruent opposite angles are created.v
Supplementary Angles are two angles whose measures add up to 180.
Adjacent Angles Vertical Angles
Supplementary AnglesComplementary Angles
The symbol is used to represent “congruent.”1 2 is read as angle 1 is congruent to angle 2.
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Problem SolvingWith Pairs of Angles
• If A and B are complementary and the measure of A is 86°, ∠ ∠ ∠what is the measure of B?∠• 4°
• What is the measure of C if C and D are supplementary and ∠ ∠ ∠the measure of D is 97°?∠• 83°
• Determine whether the statement is true or false. If the statement is true, draw a diagram to support it. If the statement is false, explain why.• An obtuse angle and an acute angle are always supplementary.• FALSE.
• Complementary angles must be acute.• TRUE
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Angle Relationships
• Lines in a plane that never intersect are parallel lines. When two parallel lines are intersected by a third line, this line is called a transversal.
If a pair of parallel lines is intersected by a transversal, these pairs of angles are congruent.• Alternate interior angles are
on opposite sides of the transversal and inside the parallel lines.• 3 5 , 4 6
• Alternate exterior angles are on opposite sides of the transversal and outside the parallel lines.• 1 7 , 2 8
• Corresponding angles are in the same position on the parallel lines in relation to the transversal.• 1 5 , 2 6• 3 7 , 4 8
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Using Angle Relationships
• Classify each pair of angles shown.• 1 and 5• corresponding
• 3 and 5• alternate interior
• 6 and 4• alternate interior
• 7 and 1• alternate exterior
• In the figure, if m2 = 74°, find each measure.• m8• 74°
• m6• 74°
• m4• 74°
• m1• 106°
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TrianglesTarget:Classify triangles and find missing angle measures.
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Angles of Triangles
• A triangle is a figure with three sides and three angles. The symbol for triangle is △.
• The sum of the measures of the angles of a triangle is 180°.• In ABC, if △ mA = 25° and mB = 108°, what mC? • Add up the measures given and subtract from 180.• 47
• Find the missing measures in the giventriangles.
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Classify Triangles
• Every triangle has at least two acute angles. One way to classify angles is to use the third angle.
• Another way to classify angles is by their sides. Sides with the same length are congruent segments.
The tick marks on
the sides of the
triangles indicate
that those sides are
congruent.
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Practice with Triangles
• Find the missing angle measure.
• Classify each triangle by its angles and its sides.
1. 442. 1343. 45
6. Acute, equilateral
7. Right, scalene
8. Acute, isosceles
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Challenge!
Triangle ABC is formed by two parallel lines and two transversals. Find the measure of each interior angle A, B, and C of the triangle.With your group, discuss this problem and how you might go about solving it. You may want to look back in your notes about parallel lines and transversals.
mA = 61°mB = 72°mC = 47°
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QuadrilateralsTarget:Classify quadrilaterals and find missing angle measures.
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Angles of a Quadrilateral
• A quadrilateral has four sides and four angles.• The sum of the measures of the angles of a quadrilateral is
360°.Find the missing angle in each quadrilateral.
a. 58b. 161
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Classifying Quadrilaterals
• The red arcs showcongruent angles.
• The red squarecorner indicatesa perpendicularline, forming a right angle.
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Practice with Quadrilaterals
• Find the missing angle.
• Classify each quadrilateral.
10013565
rectangle
square
parallelogram
trapezoidquadrilateral
rhombus
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Polygons and AnglesTarget:Find the sum of the angle measures of a polygon and the measure of an interior angle of a regular polygon.
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Polygons
• A polygon is a simple, closed figure formed by three or more straight line segments.• A simple figure does not have lines that cross each other.• You have drawn a closed figure when your pencil ends up
where it started.
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Polygon Classification
• Polygons are classified by the number of sides it has.
• An equilateral polygon has all sides congruent.• A polygon is equiangular if all of its angles are congruent.• A regular polygon is equilateral and equiangular, with all sides and angles congruent.
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Finding Interior Angles
• The sum of the measures of the angles of a triangle is 180°. You can use this relationship to find the measures of the angles of polygons.• With your partner, use diagonals to find the sum of the interior
angles of several different polygons. Use the worksheet provided.
• Interior Angle Sum of a Polygon• The sum of the measures of the angles of a polygon is
(n – 2)180, where n represents the number of sides.• S = (n – 2)180
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Interior Angle Practice
• Using what you know about the sum of interior angles, find the value of each variable.
x = 83, y = 74
x = 128 x = 20