![]() At the point of contact, the adjacent central angles are not equal, but the opposing central angles are in this case, AOB = COD & BOC = AOD, but AOB AOD or BOC, & BOC COD or AOB.Īny shape’s diagonal length is a function of the size of its sides.The diagonals are not parallel to one another in this case, diagonals AC and BD are not parallel.Each diagonal splits a rectangle into two identical right-angled triangles in this case, AC splits ABCD into two ABCs and an ADC, and BD splits ABCD into two BCDs and a BAD.The diagonals equally cut each other in half in this case, AC and BD do so.The two diagonals are congruent (identical in length) in this case, the diagonals are AC and BD, and AC equals BD.L stands for the rectangle’s length, w is the rectangle’s width. The formula for a rectangle’s diagonal is as follows: When the triangle ABD is subjected to Pythagoras’ Theorem, Let d represent the length of each diagonal. Consider a rectangle that is “l” length and “w” width. The Pythagorean theorem is used to derive the diagonal of a rectangle formula. Derivation of the diagonal of a rectangle: The formula for calculating a rectangle’s diagonal length is ![]() ![]() A diagonal divides a rectangle into two right triangles, each of which has a hypotenuse and sides that are equal to the sides of the rectangle while the diagonal is the hypotenuse. A line segment that connects any two of a rectangle’s non-adjacent vertices is said to be its diagonal.
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