# what is the Difference Between Rhombus And Parallelogram?

the basic difference between Rhombus and Parallelogram is that a Rhombus is a four equal-sided parallelogram quadrilateral having four sides of the same length with two acute and obtuse angles. it also has two sets of parallel lines while a parallelogram has two pairs of opposite sides with two acute and obtuse angles and two sets of parallel lines.

In this article, you are going to learn a complete explanation of the Difference Between Rhombus And Parallelogram in detail.

This Article Also includes:

- Overview
- What is Rhombus?
- What is Parallelogram?
- Examples of both
- Lots more…!

So if you want to get benefits from this post you’ll love this article.

Let’s Dive right in…!

**Overview**

in mathematical geometry, we have different types of quadrilaterals. a quadrilateral is a polygon having four sides. parallelogram, kite, square, rhombus, rectangle, and trapezium are common types of quadrilaterals. they all possess almost similar characteristics but are known as different from each other.

people often seem to be confused regarding Parallelograms and Rhombi. they might think that both are the same in pictorial view and only named interchangeably.

but…!

although both Rhombi and Parallelograms look similar and both have four sides and vertices, they are completely different shapes.

## What is a Rhombus?

The word “rhombus” is Derived from the Greek ῥόμβος (*rhombos*), having meant something which can spin which derives from the verb ῥέμβω (*rhembō*), meaning “to turn round and round. in Euclidean geometry, a rhombus four-sided equal lengths flat-shaped quadrilateral is also known as an equilateral quadrilateral.

their opposite sides are always congruent and parallel to each other. a diamond is a suitable example of a rhombus. it is a similar or special form of kite shape which do not self-intersect.

A rhombus has an equal measure of its opposite angles. moreover, if two of their diagonals will perpendicular to each other, it is called an orthodiagonal rhombus. each type of rhombus is considered a parallelogram but not every parallelogram is considered a rhombus.

## What is Parallelogram?

A parallelogram is a simple, flat-shaped, and non-self-intersecting quadrilateral. it has two pairs of parallel and congruent sides with equal lengths. their opposite angles are also equal in measure. the diagonals bisect each other in a way that they form congruent triangles with each other.

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