Quadrilaterals and Polygons
description
Transcript of Quadrilaterals and Polygons
Quadrilaterals and PolygonsPolygon: A plane figure that is formed by three or more segments (no two of which are collinear), and each segment (side) intersects at exactly two other sides – one at each endpoint (Vertex).
Which of the following diagrams are polygons?
Polygons are Named & Classified by the Number of Sides They Have
# of Sides Type of Polygon
3
4
5
6
7
# of Sides Type of Polygon
8
9
10
12
#
What type of polygons are the following?
Triangle
Quadrilateral
Pentagon
Hexagon
Heptagon
Octagon
Nonagon
Decagon
Dodagon
N-gon
Convex and Concave Polygons
Interior
Convex – A polygon is convex if no line that contains a side of the polygon contains a point in the interior of the polygon.Concave – A polygon that is not convex
Interior
Equilateral, Equiangular, and Regular
Diagonals and Interior Angles of a Quadrilateral
Diagonal – a segment that connects to non-consecutive vertices.
Theorem 6.1 – Interior Angles of a Quadrilateral TheoremThe sum of the measures of the interior angles of a quadrilateral is 360O
m<1 + m<2 + m<3 + m<4 = 360o
80o 70o
xo 2xo
Properties of Parallelograms
Theorem 6.2If a quadrilateral is a parallelogram, then its opposite sides are congruent. PQ = RS and SP = QR
Theorem 6.3If a quadrilateral is a parallelogram, then it opposite angles are congruent. <P = < R and < Q = < S
Theorem 6.4If a quadrilateral is a parallelogram, then its consecutive angles are supplementary. m<P + m<Q = 180o, m<Q + m<R = 180o
m<R + m<S = 180o, m<S + m<P = 180o
Theorem 6.5If a quadrilateral is a parallelogram, then its diagonals bisect each other. QM = SM and PM = RM
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Q R
P S
Q R
P S
Q R
P S
Q R
P S
Using the Properties of Parallelograms
FGHJ is a parallelogram.Find the length of:
a. JHb. JK
F 5 G
K 3
J H
PQRS is a parallelogram.Find the angle measures:
a. m<Rb. m<Q
Q R
70o
P S
PQRS is a parallelogram.Find the value of x
P Q
3xo 120o
S R
Proofs Involving Parallelograms A E B 2
1D C
3G F
Given: ABCD and AEFG are parallelograms
Prove: <1 = < 3
Statements Reasons
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Plan: Show that both angles are congruent to <2
1. ABCD & AEFG are Parallelograms 1. Given2. <1 = < 2 2. Opposite Angles are congruent (6.3)3. <2 = <3 3. Opposite Angles are Congruent (6.3)4. <1 = <3 4. Transitive Property of Congruence~
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Proving Theorem 6.2
Given: ABCD is a parallelogram
Prove: AB = CD, AD = CB
Statements Reasons
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A B
D C
Plan: Insert a diagonal which will allow us to divide the parallelogram into two triangles
1. ABCD is a parallelogram 1. Given2. Draw Diagonal BD 2. Through any two points there
exists exactly one line3. AB || CD, and AD || CB 3. Def. of a parallelogram
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4. <ABD = < CDB 4. Alternate Interior Angles Theorem5. <ADB = < CBD 5. Alternate Interior Angles Theorem6. DB = DB 6. Reflexive Property of Congruence7. /\ ADB = /\ CBD 7. ASA Congruence Postulate8. AB = CD, AD = CB 8. CPCTC
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Proving Quadrilaterals are Parallelograms
Theorem 6.6If both pairs of opposite sides of a quadrilateral are congruent, then the quadrilateral is a parallelogram
Q R
P S
Q R
P S
Theorem 6.9If the diagonals of a quadrilateral bisect each other, then the quadrilateral is a parallelogram
Q R
P S
(180-x)o xo
xo
Theorem 6.8If an angle of a quadrilateral is supplementary to both of its consecutive angles, then the quadrilateral is a parallelogram
Q R
P S
Theorem 6.7If both pairs of opposite angles of a quadrilateral are congruent, then the quadrilateral is a parallelogram
Concept Summary – Proving Quadrilaterals are Parallelograms
• Show that both pairs of opposite sides are
• Show that both pairs of opposite sides are
•Show that both pairs of opposite angles are
• Show that one angle is supplementary to
• Show that the diagonals
• Show that one pair of opposite sides are both
congruent
parallel
congruent
BOTH consecutive interior <‘s
bisect each other
congruent and ||
Proving Quadrilaterals are Parallelograms – Coordinate Geometry
C(6,5)
B(1,3)
D (7,1)
A(2, -1)
How can we prove that the Quad is a parallelogram?
1. Slope - Opposite Sides ||
2. Length (Distance Formula) – Opposite sides same length
3. Combination – Show One pair of opposite sides both || and congruent
Rhombuses, Rectangles, and Squares
Rhombus – a parallelogram with four congruent sides
Rectangle – a parallelogram with four right angles
Square – a parallelogram with four congruent sides and four right angles
Parallelograms
RhombusesSquares
Rectangles
Using Properties of Special Triangles
If ABCD is a rectangle, what else do you know about ABCD?
A B
C D
Corollaries about Special Quadrilaterals
Rhombus Corollary – A quad is a rhombus if and only if it has four congruent sidesRectangle Corollary – A quad is a rectangle if and only if it has four right anglesSquare Corollary – A quad is a square if and only if it is a rhombus and a rectangle
How can we use these special properties and corollaries of a Rhombus? P Q
S R
2y + 3
5y - 6
Using Diagonals of Special Parallelograms
Theorem 6.11: A parallelogram is a rhombus if and only if its diagonals are perpendicular
Theorem 6.12: A parallelogram is a rhombus if and only if each diagonal bisects a pair of opposite angles.
Theorem 6.13: A parallelogram is a rectangle if and only if its diagonals are congruent
Decide if the statement is sometimes, always, or never true.1. A rhombus is equilateral.
2. The diagonals of a rectangle are _|_.
3. The opposite angles of a rhombus are supplementary.
4. A square is a rectangle.
5. The diagonals of a rectangle bisect each other.
6. The consecutive angles of a square are supplementary.
Always
Sometimes
Sometimes
Always
Always
Always
Quadrilateral ABCD is Rhombus.7. If m <BAE = 32o, find m<ECD.8. If m<EDC = 43o, find m<CBA.9. If m<EAB = 57o, find m<ADC.10. If m<BEC = (3x -15)o, solve for x.11. If m<ADE = ((5x – 8)o and m<CBE = (3x +24)o, solve for x12. If m<BAD = (4x + 14)o and m<ABC = (2x + 10)o, solve for x.
A B
E
D C
32o
86o
66o
35o
16 26
Coordinate Proofs Using the Properties of Rhombuses, Rectangles and Squares
Using the distance formula and slope, how can we determine the specific shape of a parallelogram?
Rhombus –
Rectangle –
Square -
Based on the following Coordinate values, determine if each parallelogramis a rhombus, a rectangle, or square.
P (-2, 3) P(-4, 0)Q(-2, -4) Q(3, 7)R(2, -4) R(6, 4)S(2, 3) S(-1, -3)
Given: HIJK is a parallelogram/\ HOI = /\ JOI
Prove: HIJK is a Rhombus
Statements Reasons
H I
O
K J
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Given: RECT is a Rectangle
Prove: /\ ART = /\ ACE
Statements Reasons
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R E
A
T C
Given: PQRT is a Rhombus
Prove: PR bisects <TPQ and < QRT, and QT bisects <PTR and <PQP
Statements Reasons
P Q
T R
Plan: First prove that Triangle PRQ is congruent to Triangle PRT; and Triangle TPQ is congruent to Triangle TRQ
Trapezoids and Kites
A B
D C>
>A Trapezoid is a Quad with exactly one pair of parallel sides. The parallel sides are the BASES. A Trapezoid has exactly two pairs of BASE ANGLES
In trapezoid ABCD, Which 2 sides are the bases? The legs? Name the pairs of base angles.
A B
D C>
>If the legs of the trapezoid are congruent, then the trapezoid is an Isosceles Trapezoid.
Theorems of Trapezoids
Theorem 6.14If a trapezoid is isosceles, then each pair of base angles is congruent.
<A = <B = <C = <D~ ~ ~
A B
D C>
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Theorem 6.15If a trapezoid has a pair of congruent base angles, then it is an isosceles trapezoid.
ABCD is an isosceles trapezoid
A B
D C>
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Theorem 6.16A trapezoid is isosceles if and only if its diagonals are congruent.
ABCD is isosceles if and only if AC = BD__
A B
D C>
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Kites and Theorems about Kites
A kite is a quadrilateral that has two pairs of consecutive congruent sides,But opposite sides are NOT congruent.
Theorem 6.18If a Quad is a Kite, then its diagonals are perpendicular.
Theorem 6.19If a Quad is a kite then exactly one pair of opposite angles are congruent
Using the Properties of a Kite
X
12
20 U 12 W Y
12
Z
Find the length of WX, XY, YZ, and WZ.
J
H 132o 60o K
G
Find the angle measures of <HJK and < HGK
Summarizing the Properties of Quadrilaterals
Quadrilaterals
______________ _________________ ________________
____________ _____________ ____________ ______________
Kites Parallelograms Trapezoids
Rhombus Squares Rectangles Isosceles Trap.
Properties of Quadrilaterals
X X X X
X
X X X X X
X X X X
X X X X
X X
X X X X
X X X
Property Rectangle Rhombus Square Kite TrapezoidBoth pairs of Opp. sides a ||Exactly one pair of Opp. Sides are ||Diagonals are _|_Diagonals are =Diagonals Bisect each otherBoth pairs of Opp. Sides are =Exactly one pair of opp. Sides are =All Sides are =Both pairs of Opp. <'s are =Exactly one pair of Opp <'s are =All <'s are =
Using Area Formulas
Area of a Square PostulateThe area of a square is the square of the length of its side.
Area Congruence PostulateIf two polygons are congruent then they have the same area.
Area Addition PostulateThe area of a region is the sum of the area of its non-overlapping sides.
Area of a RectangleThe area of a rectangle is the product of its base and height.
A = bh
Area of a ParallelogramThe area of a parallelogram is the product of a base, and it’s corresponding height
A = bh
Area of a TriangleThe area of a triangle is one half the product of a base and its corresponding height
A = ½bh
h
b
h
b
h
b
Given: /\ RQP = /\ ONP R is the midpoint of MQProve: MRON is a parallelogram
Statements Reasons
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Q
R P O
M N
1. /\ RQP = /\ ONP 1. Given R is the midpoint of MQ
2. MR = RQ 2. Definition of a midpoint
3. RQ = NO 3. CPCTC
4. MR = NO 4. Transitive Property of Congruency
5. <QRP = < NOP 5. CPCTC
6. MQ || NO 6. Alternate Interior <‘s Converse
7. MRON is a parallelogram 7. Theorem 6.10
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Given: UWXZ is a parallelogram, <1 = <8Prove: UVXY is a parallelogram
Statements Reasons
U V W
Z Y X
2 3 4 1
8 5 6 7
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1. UWXZ is a parallelogram 1. Given
2. UW || ZX 2. Definition of a parallelogram
3. UV || YX 3. Segments of Congruent Segments
4. <Z = <W 4. Opposite <‘s of a parallelogram are =
5. <1 = <8 5. Given
6. <5 = <4 6. Third Angles Theorem
6. <4 = <7 7. Alternate Interior Angles Theorem
6. <5 = <7 8. Transitive Property of Congruence
7. UY || VX 9. Corresponding Angles Converse
8. UVXY is a parallelogram 10. Definition of a Parallelogram
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Given: GIJL is a parallelogram
Prove: HIKL is a parallelogram
Statements Reasons
L K J
M
G H I
1. GIJL is a parallelogram 1. Given
2. GI || LJ 2. Definition of a parallelogram
3. <GIL = <JLI 3. Alternate Interior Angles Theorem
4. GJ Bisects LI 4. Diagonals of a parallelogram bisect
5. MI = ML 5. Definition of a Segment Bisector
6. <HMI = <KML 6. Vertical Angles Theorem
7. /\ HMI = /\ KML 7. ASA Congruence Postulate
8. MH = MK 8. CPCTC
9. HK and IL Bisect Each other 9. Definition of a Segment Bisector
10. HIKL is a parallelogram 10. Theorem 6.9
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