6'3 Proving Quadrilaterals are ograms - PowerPoint PPT Presentation

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6'3 Proving Quadrilaterals are ograms

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Graph; then use one of today's theorems and distance formula and/or slope ... using distance formula cont. JM= KL= Both pairs of opp sides are _at_ Example cont ... – PowerPoint PPT presentation

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Title: 6'3 Proving Quadrilaterals are ograms


1
6.3 Proving Quadrilaterals are ograms
  • Pg 338

2
Thm 6.6
  • If both pairs of opposite sides of a
    quadrilateral are _at_, then the quadrilateral is a
    parallelogram.

A
B
__ __
ABCD is a parallelogram
__
__
C
D
__ __
3
Thm 6.7
  • If both pair of opposite ?s of a quadrilateral
    are _at_, then the quadrilateral is a ogram.

B
A
((
)
ABCD is a parallelogram
))
(
C
D
4
Thm 6.8
  • If an ? of a quadrilateral is supplementary to
    both of its consecutive ?s, then the
    quadrilateral is a ogram.

B
A
(180-x)
x
ABCD is a parallelogram
x
C
D
5
Thm 6.9
  • If the diagonals of a quadrilateral bisects each
    other, then the quadrilateral is a ogram.

B
A
__
__ __
__
__ __
C
D
ABCD is a parallelogram
6
Thm 6.10
  • If one pair of opposite sides of a quadrilateral
    are ? and then the quadrilateral is a ogram.

B
gt
A
ABCD is a parallelogram
gt
C
D
7
Exampledetermine whether the a quadrilateral is
a ogram and explain why or why not.
__
  • Yes its a ogram because both pair of opposite
    sides are _at_.

__ __
__ __
__
8
Example cont.
  • Yes because the 2 triangles are ? by SAS post, so
    its a parallelogram because both pairs of sides
    are ?.

B
A
__
)
__
__
(
D
C
9
Example cont.
  • Yes because its parallelogram by the def of a
    parallelogram.

gt



gt
10
Example cont.
  • No, because consecutive ?s are not
    supplementary.

65o
65o
110o
11
ExampleProve that the pts. represent the
vertices of a ogram
  • J (-6,2)
  • K(-1,3)
  • L(2,-3)
  • M(-3,-4)
  • Graph then use one of todays theorems and
    distance formula and/or slope formula or use def
    of a parallelogram and slope formula.

12
Example cont.Using thm 6.6 and distance formula
JK
ML
13
Exampleusing distance formula cont.
JM
Both pairs of opp sides are _at_
KL
14
Example contusing the def of ogram and slope
m of JK
m of ML
15
Example cont.
m of JM
Opposite side are ll
m of KL
16
Assignment
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