ej=-f------- · 2017. 5. 30. · quad 05) fill in each answer space with l\lways, sometimes or...
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---,--~-.:....::ej=-f--------Geometry - Spring 20 J J Period Date
IQuad 01 Each of the following drawings describes the definition of a quadrilateral. The drawings are not to scale. Name the quadrilateral defined. Use each definition ONLY once.
ii) Rectangle
iii) RJlOmbus
iv) Square
v) Trapezoid
vi)
vii)
Quad 02
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Quad 02) Fill in each answer space with Always~Sometimes or Never to make a true statement. a) A rhombus is A a parallelogram. b) A trapezoid is ~ a parallelogram. c) A kite is A a quadrilateral. d) A parallelogram is
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Quad 05) Fill in each answer space with l\lways, Sometimes or Never to make a true statement. 3) A qUZldrilateral with t\Vo sets of parallel sides is A :1 parallelogram. b) A parallelogram with adjacent angles supplementary is S a rectangle c) A quadrilateral with diagonals that are congruent and perpendicular is A a square. d) A quadrilateral with .1 diagonals, and (Jdjacent angles 110( congruent is S a kite. e) A quadrilateral with .1 diagonals, and adjacent angles supplementary is N a kite. D A parallelogram with opposite sides congruent is S a rhombus. g) A quadrilateral with opposite angles congruent is A a parallelogram. h) A quadrilateral with adjacent angles supplementary is A a parallelogram. i) A quadrilateral with any adiacent anl2les conQruent & supplementary is S rectanQle.
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Quad06) Use two column proof to prove: If rectangle, then diagonals congruent. 'Sffi\~~
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Find the value of the variable for each quadrilateral shown below (j) PARL is parallelogram I~ b) RECT is rectangle c) TRAP is a trapezoid.
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Quad 07) Use flow proof to in v then rhombus.
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Given: ~':!.:-o.() [g~!~vJl U ':;:! ~ y.. )~)'.. ~
Prove:6 \-h:rF t ~ Rh~iY' v,,:>
Quad 08) Solve.
a)
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