Viviani’s theorem and related problems
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- Proof without words using vectors (Hans Samelson, 2003)
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Proof using area formula Let S denote area. It holds: = × = 1 2 × + = 1 2 × ( + ) + = + 1 2 = 1 2 ℎ 1 2 = ℎ Similarly: = 1 2 × = 1 2 × + = ℎ Theorem 2. The sum of the distances from any point P inside a p arallelogram is independent of the location of P. 2020 Singapore Mathematics Project Festival Viviani’s Theorem and its Related Problems 5 P + + + = ℎ × ( + ) Since the left-hand-side expression is a constant, the sum of distance is aso a constant. Thus, it is independent of the location of point P. Proof without words using vectors (Hans Samelson, 2003) | | = | | = | | + + = 0 . + . + . = 0 ( − ′) + ( − ′) + ( − ′) = 0 + + = ′ + ′ + ′ The converse also holds: 2. 2k-sided polygons with parallel opposite sides From the result above on the parallelogram, it is generalized to 2n-gon with opposite sides parallel. In other words, it is stated: Let P be the arbitrary interior point in the polygon. Let the opposite parallel side of be . Since the polygon has 2k sides, which is an even number and opposite sites are parallel, those pairs of opposite sides parallel would also have the same length. Let the length of the first pair of opposite sides parallel be . Theorem 2.2. If the sum of the distances from a point in the interior of a quadrilateral to the sides is independent of the location of the point, then the quadrilateral is a parallelogram . Theorem 3. In a 2k-sided polygon with opposite sides parallel, the sum of distances from an arbitrary point inside the polygon to its sides is constant and is independent of the point’s position. 2020 Singapore Mathematics Project Festival Viviani’s Theorem and its Related Problems 6 ( ) ( ) + = ( + ) Noted that the sum of all the triangles with the same vertex P equals to the area of the polygon and + is indeed the distance between the pair of parallel sides. Since the sum of distances between any pair of opposite parallel sides is constant, it follows that the sum of all pairwise sums between the pairs of parallel sides, is also constant. However, the converse of this generalization is not true. A counterexample that can be easily found is an equilateral hexagon, which does not necessarily have opposite sides parallel but still have constant sum of distances from an arbitrary point. Yüklə 1,31 Mb. Dostları ilə paylaş:
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