area of triangle formed by joining the midpoints of alternate sides of a hexagon
Answers
Answer:
a triangle is formed by joining mid points of alternate sides of a regular hexagon. what is the ratio of area of triangle so formed and area of regular hexagon. Area of ∆ UQS or ∆ RTP = 9 ( Area of small triangle ) ( As we can see in both triangle we have 9 small triangle .
Answer:
If area of triangle formed by joining the midpoints of alternate sides of a hexagon then the Area of ∆ UQS or ∆ RTP will be equal to 9
Step-by-step explanation:
To Find:
By linking the midpoints of the opposite sides of a regular hexagon, a triangle is created.
What is the ratio between the so-formed triangle's and regular hexagon's surface areas.
UQS or RTP area equals 9 ( Area of small triangle ) (As you can see, there are nine little triangles in each triangle.
Area of ∆ UQS or ∆ RTP = 9
therefore, if area of triangle formed by joining the midpoints of alternate sides of a hexagon then the Area of ∆ UQS or ∆ RTP will be equal to 9
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