A kite has two pairs of sides and each pair is made up of adjacent sides that are equal in length. A rhombus has 4 equal sides.
So most kites are NOT rhombuses, but if the two pair happen to be equal, then the kite is a rhombus.
They are a square, a rhombus and a kite.
No. All rhombi (rhombuses) are parallelograms but all parallelograms are not rhombi.
All squares are a special type of rhombi. The special feature is that all angles of squares are equal.
Parallelograms and rhombi are both quadrilaterals with opposite sides that are parallel and equal in length. However, a rhombus is a specific type of parallelogram where all four sides are equal in length. Additionally, while all rhombi have diagonals that bisect each other at right angles, not all parallelograms share this property. Thus, while all rhombi are parallelograms, not all parallelograms are rhombi.
All squares are rhombi
They are a square, a rhombus and a kite.
Squares, rectangles, rhombi, kites and arrowheads do. Other parallelograms and general quadrilaterals do not.
umm, obviously?! diamonds, rhombi(plural for rhombus), rectangles, kites
Yes, all squares are rhombi (aka rhombuses), but all rhombi are not squares.
You must be talking about a rhombus.In a rhombus, all four sides are congruent, opposite angles are congruent, and opposing sides are parallel. Rectangles, squares, and kites must be rhombi, and rhombi must be parallelograms, quadrilaterals, and polygons.
Yes, all rhombi are parallelograms. If you understand the concept "parallelogram" then you will know that rhombi
Because all rhombi are parallelograms.
No. All rhombi (rhombuses) are parallelograms but all parallelograms are not rhombi.
All squares are a special type of rhombi. The special feature is that all angles of squares are equal.
no they are not
No.
Parallelograms and rhombi are both quadrilaterals with opposite sides that are parallel and equal in length. However, a rhombus is a specific type of parallelogram where all four sides are equal in length. Additionally, while all rhombi have diagonals that bisect each other at right angles, not all parallelograms share this property. Thus, while all rhombi are parallelograms, not all parallelograms are rhombi.