Square, rectangle, rhombus A.K.A. diamond, parallelogram (Maybe there's more, but these are what I can recall)
Parallelogram is the answer you Knowas well as rectangleAlso a square, and a rhombus
Each diagonal of a rhombus would never bisect a pair of opposite angles, but the diagonals are perpendicular to each other
Trapezoid.
Only for a square or rhombus (diamond shape). The diagonals of a rectangle bisect each other, but are not perpendicular and do not bisect the opposite angles they join.
Yes, they do. Also, they are congruent to each other. * * * * * They do bisect each other but they are not congruent.
In an arrowhead (or delta) shape, the diagonals do not bisect each other at their midpoints. Instead, one diagonal is typically longer and intersects the other at a point that is not the midpoint of either diagonal. Thus, while they do intersect, they do not bisect each other.
Parallelogram is the answer you Knowas well as rectangleAlso a square, and a rhombus
Yes, in the figure of a kite one diagonal bisects the other. They do not bisect each other.
No, they do not. Only the longer diagonal bisects the shorter diagonal.
A parallelogram a rectangle a square and a rhombus
They bisect each other at 90 degrees. They are the perpendicular bisectors of each other.
2 diagonals bisect each other only in the case of square , parallelogram, rhombus , rectangle and isosceles trapezium ;not in ordinary quadrilaterals.
Each diagonal of a rhombus would never bisect a pair of opposite angles, but the diagonals are perpendicular to each other
Trapezoid.
Yes. The diagonals of any parallelogram bisect each other. A rectangle is a special case of a parallelogram.
A square has 2 diagonals that are equal in length and bisect each other at right angles.
In a parallelogram, each diagonal divides the shape into two congruent triangles, ensuring that the areas of the resulting triangles are equal. The diagonals also bisect each other, meaning they intersect at their midpoints. Additionally, the diagonals can be used to determine the properties of the parallelogram, such as its symmetry and area.