William's Polygons
Level A
A)William likes to play with the yellow regular hexagons. Th...
Mathematics, 01.07.2020 23:01 jwagner2277
William's Polygons
Level A
A)William likes to play with the yellow regular hexagons. The heragon has sides
that are each one unit in length. He knows he can separate one henagoa into
equilateral triangles that also have sides one unit in lengtis
How many equilateral triangles will be needed?
Show how,
B)Using other polygons, how else can the hexagon be separated?
Show the other possibilities and explain.
Answers: 1
Mathematics, 21.06.2019 18:30, budjasdatazaki467
Let f(x) = 3 − x . find the average rate of change of f(x) from x = a to x = a + h and simplify your answer so that no single factor of h is left in the denominator.
Answers: 1
Mathematics, 21.06.2019 22:10, ansonferns983
Given: ae ≅ ce ; de ≅ be prove: abcd is a parallelogram. we have that ab || dc. by a similar argument used to prove that △aeb ≅ △ced, we can show that △ ≅ △ceb by. so, ∠cad ≅ ∠ by cpctc. therefore, ad || bc by the converse of the theorem. since both pair of opposite sides are parallel, quadrilateral abcd is a parallelogram.
Answers: 1
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