Rhombus: Difference between revisions

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As with all quadrilaterals, the sum of the interior angles of a rhombus is 360 degrees; as with a parallelogram, it can be shown that the angles of opposite pairs of vertices are equal.
As with all quadrilaterals, the sum of the interior angles of a rhombus is 360 degrees;  
as with a parallelogram, the angles of opposite pairs of vertices are equal,
and the sum of the angles of two adjacent vertices is 180 degrees.


The perimeter of a rhombus is equal to 4 times the length of one side.  The area of a square is equal to the length of the side multiplied by itself, multiplied by the [[sine]] of the angle between the sides.<ref>Since the sum of the four angles is 360 degrees, and pairs of angles are equal, the sum of the angles of two adjacent vertices is 180 degrees.  Since sin(180-x)=sin(x), the formula produces the same result no matter which vertex angle is chosen.
The perimeter of a rhombus is equal to 4 times the length of one side.   
The area of a rhombus is equal to the length of the side multiplied by itself,  
multiplied by the [[sine]] of the angle between the sides.  
(Since sin(180-x)=sin(x) this does not depend on the choice of the angle.)


Any rhombus can [[tile (mathematics)|tile]] a plane with no voids.
Any rhombus can [[tile (mathematics)|tile]] a plane with no voids.

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A rhombus. All sides (marked blue) are of equal length; opposite angles (same color arc) are equal; diagonals cross at right angles.

A rhombus or rhomb is a polygon of four sides of equal length. The angles of each pair of opposite vertices are equal. A rhombus is a special case of a parallelogram where all four sides are of equal length. A square is a special case of rhombus, where all four vertex angles are equal.

Properties

As with all quadrilaterals, the sum of the interior angles of a rhombus is 360 degrees; as with a parallelogram, the angles of opposite pairs of vertices are equal, and the sum of the angles of two adjacent vertices is 180 degrees.

The perimeter of a rhombus is equal to 4 times the length of one side. The area of a rhombus is equal to the length of the side multiplied by itself, multiplied by the sine of the angle between the sides. (Since sin(180-x)=sin(x) this does not depend on the choice of the angle.)

Any rhombus can tile a plane with no voids.