Rhombus vs Other Quadrilaterals
Let’s see the comparison of rhombus with other common quadrilaterals in the table below.
Difference between Rhombus and Other Quadrilaterals |
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Features |
Rhombus | Square | Rectangle | Parallelogram | Trapezoid |
Sides | All sides equal length | All sides equal length | Opposite sides equal | Opposite sides equal | Only one pair of opposite sides parallel |
Angles | Opposite angles equal | All angles are 90° | All angles are 90° | Opposite angles equal | No specific angle properties |
Diagonals | Bisect each other at right angles and are not equal | Bisect each other at right angles and are equal | Bisect each other but not at right angles and are equal | Bisect each other but not at right angles and are not equal | No specific diagonal properties |
Symmetry | Both line and rotational symmetry | Both line and rotational symmetry | Line symmetry | Line symmetry | Typically no line or rotational symmetry |
Parallel Sides | Opposite sides are parallel | All sides are parallel | Opposite sides are parallel | Opposite sides are parallel | Only one pair of opposite sides parallel |
Area Formula | Base × Height or 1/2×Product of diagonals |
Side² | Length × Width | Base × Height | 12×(Sum of parallel sides)×Height21×(Sum of parallel sides)×Height |
Special Properties | All sides are equal and it is a parallelogram | All properties of a rectangle and a rhombus | Diagonals are equal and bisect each other | Opposite sides are equal and parallel, opposite angles are equal | Only one pair of opposite sides is required to be parallel |
Also Read
Rhombus: Definition, Properties, Formula and Examples
Rhombus is a quadrilateral with all four sides equal and opposite sides parallel to each other. The opposite angles of a rhombus are equal. Any rhombus can be considered a parallelogram, but not all parallelograms are rhombus.
Let’s know more about Rhombus and it’s properties, examples and formula in detail below.