Trapezoid
From Free net encyclopedia
In acrobatics, the trapeze is a certain acrobatic device that is shaped like a trapezoid.
In anatomy, the trapezoid bone is a certain bone in the hand.
Image:Trapezoid.svg A trapezoid (American English) or trapezium (Commonwealth English) is a quadrilateral two of whose sides are parallel to each other. Some authors define it as a quadrilateral having exactly one pair of parallel sides, so as to exclude parallelograms.
- Note that there is another confusingly-named quadrilateral that has no parallel sides: the trapezium (American English) or trapezoid (Commonwealth English). To avoid confusion, this article uses the American English wording, and admits parallelograms as special cases.
In an isosceles trapezoid, the base angles are congruent, and so are the pair of non-parallel opposite sides.
If the other pair of opposite sides is also parallel, then the trapezoid is also a parallelogram. Otherwise, the other two opposite sides may be extended until they meet at a point, forming a triangle that the trapezoid lies inside.
A quadrilateral is a trapezoid if and only if it contains two adjacent angles that add up to one straight angle, i.e., to 180 degrees or π radians. Another necessary and sufficient condition is that the diagonals cut each other in mutually the same ratio.
The area of a trapezoid can be computed as the arithmetic mean of the lengths of the two parallel sides, multiplied by the distance along a perpendicular line between them. This yields as a special case the well-known formula for the area of a triangle, by considering a triangle as a degenerate trapezoid in which one of the parallel sides has shrunk to a point.
Thus, if a and b are the two parallel sides and h is the distance (height) between the parallels, the area formula is as follows:
<math>A= \frac{a+b}{2}h</math>
Another formula for the area can be used when all that is known are the lengths of the four sides. If the sides are a, b, c and d, and a and c are parallel (where a is the longer parallel side), then:
<math>A=\frac{a+c}{4(a-c)}\sqrt{(a+b-c+d)(a-b-c+d)(a+b-c-d)(-a+b+c+d)}</math>
If the trapezoid above is divided into 4 triangles by its diagonals AC and BD, intersecting at O, then the area of ΔAOD is equal to that of ΔBOC, and the product of the areas of ΔAOD and ΔBOC is equal to that of ΔAOC and ΔBOD.
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