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Constructions and Tilings Practice 3: Design and Reasoning and Tilings and Tessellations

Concept Check

Question 1mcq
Which regular polygon can tile a floor by itself without gaps or overlaps?
A.regular hexagon
B.regular pentagon
C.regular heptagon
D.circle
Question 2mcq
Which regular polygon can tile a floor by itself without gaps or overlaps?
A.regular pentagon
B.regular hexagon
C.regular heptagon
D.circle
Question 3mcq
Which regular polygon can tile a floor by itself without gaps or overlaps?
A.regular pentagon
B.regular heptagon
C.regular hexagon
D.circle
Question 4mcq
A tiling pattern leaves small gaps after every few tiles. What is the best mathematical reason?
A.The colours are not repeated.
B.The tiles are too bright.
C.The angles around meeting points do not add exactly to 360360^\circ.
D.Every polygon always tiles.
Question 5mcq
A tiling pattern leaves small gaps after every few tiles. What is the best mathematical reason?
A.The colours are not repeated.
B.The tiles are too bright.
C.Every polygon always tiles.
D.The angles around meeting points do not add exactly to 360360^\circ.
Question 6mcq
A tiling pattern leaves small gaps after every few tiles. What is the best mathematical reason?
A.The angles around meeting points do not add exactly to 360360^\circ.
B.The colours are not repeated.
C.The tiles are too bright.
D.Every polygon always tiles.

Apply and Solve

Question 7mcq
A tiling pattern leaves small gaps after every few tiles. What is the best mathematical reason?
A.The angles around meeting points do not add exactly to 360360^\circ.
B.The colours are not repeated.
C.The tiles are too bright.
D.Every polygon always tiles.
Question 8mcq
A tiling pattern leaves small gaps after every few tiles. What is the best mathematical reason?
A.The colours are not repeated.
B.The angles around meeting points do not add exactly to 360360^\circ.
C.The tiles are too bright.
D.Every polygon always tiles.
Question 9mcq
A tiling pattern leaves small gaps after every few tiles. What is the best mathematical reason?
A.The colours are not repeated.
B.The tiles are too bright.
C.The angles around meeting points do not add exactly to 360360^\circ.
D.Every polygon always tiles.
Question 10mcq
A tiling pattern leaves small gaps after every few tiles. What is the best mathematical reason?
A.The colours are not repeated.
B.The tiles are too bright.
C.The angles around meeting points do not add exactly to 360360^\circ.
D.Every polygon always tiles.
Question 11mcq
A tiling pattern leaves small gaps after every few tiles. What is the best mathematical reason?
A.The colours are not repeated.
B.The tiles are too bright.
C.Every polygon always tiles.
D.The angles around meeting points do not add exactly to 360360^\circ.
Question 12mcq
A tiling pattern leaves small gaps after every few tiles. What is the best mathematical reason?
A.The angles around meeting points do not add exactly to 360360^\circ.
B.The colours are not repeated.
C.The tiles are too bright.
D.Every polygon always tiles.