A rhombus has four equal sides.It has two pairs of parallel sides.
A rhombus is a parallelogram and so has two pairs of parallel sides. All its sides are of the same length.
No, a triangle cannot be a rhombus. A triangle is a polygon with three sides, while a rhombus is a polygon with four sides of equal length. These two shapes have different properties and cannot be the same.
A rhombus and a trapezoid do not make a specific shape together. They are two separate geometric shapes with different properties and characteristics.
Yes. There is a shape that has all the properties of a rectangle and all the properties of a rhombus at the same time. It is called a square.
A rhombus has four equal sides.It has two pairs of parallel sides.
1. A rhombus has 4 sides. 2. All sides are equal.
A rhombus is a parallelogram and so has two pairs of parallel sides. All its sides are of the same length.
No. The two shapes have very distinct properties.
No, a rhombus has specific properties
No, a triangle cannot be a rhombus. A triangle is a polygon with three sides, while a rhombus is a polygon with four sides of equal length. These two shapes have different properties and cannot be the same.
A rhombus and a trapezoid do not make a specific shape together. They are two separate geometric shapes with different properties and characteristics.
Yes. There is a shape that has all the properties of a rectangle and all the properties of a rhombus at the same time. It is called a square.
Properties of rhombus that square has :- * All sides are equal. Properties of rectangle that square has :- *Each angle is 90 degree. *Diagonals are equal.
Most rectangles are not rhombuses, but there is a shape that has all the properties of a rectangle and all the properties of a rhombus at the same time. It is called a square. A square is a special rectangle and a special rhombus.
rhombus,parallelogram
A square shares the following properties with both, a rhombus and a rectangle: Four straight sides, Two pairs of opposite sides equal, Two pairs of opposite angles equal, Diagonals that bisect one another, Rotational symmetry of order 2. There are others that is shares with one but not the other.