![]() ![]() Now let us see the derivation of the kite formula. ![]() Where d₁ and d₂ are the two diagonals of the kite. To find the area of a kite we have, formula for the area of the kite that only requires lengths of the diagonals of the kite.Īrea of a Kite = Diagonals are the two lines that intersect perpendicularly to one another. And the pieces of wood in our kite diagonals. Mathematically speaking, in the case of building your kite, the area of the kite is the size of the fabric needed to build your kite. In this article let us study how to find the area of a kite shape, formula for the area of the kite, and proof for the area of the kite. The diagonals bisect each other perpendicularly. Opposite Angles between unequal sides are equal.Ī kite has two pairs of congruent triangles with a common base.ĭiagonals of a kite intersect each other at right angles(90°). A kite’s area is always represented in terms of units^2, such as in^2, cm^2, m^2, and so on. A kite, like a square or a rhombus, does not have equal sides on all four sides. The area of a kite in a two-dimensional plane can be described as the amount of space enclosed or surrounded by the kite. We shall concentrate on the area of a kite and its formula in this post. A kite’s elements are its four angles, four sides, and two diagonals. A kite is a quadrilateral with two pairs of equal sides on each side. The space encircled by a kite is known as the kite area. Rhombus is a kite with all its four sides congruent.Ī kite is a special quadrilateral with two pairs of equal adjacent sides. We have studied that Rhombus is a four-sided quadrilateral with all its four sides equal in length. ![]()
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