In geometry, a kite, or deltoid is a quadrilateral with two disjoint pairs of congruent adjacent sides, in contrast to a parallelogram, where the congruent sides are opposite.
yes a parallelogram is congruent
A kite is not a parallelogram because the parallelogram's angles are tilted and a kite isn't.
If it is a parallelogram, then it has two sets of parallelogram sides. Parallelograms' opposite angles are congruent A parallelogram's bisectors are congruent. * * * * * A parallelogram's bisectors are NOT congruent.
The diagonals are not congruent unless the parallelogram happens to be a rectangle.
A kite is similar to a parallelogram in that both have opposite pairs of congruent sides. However, unlike a parallelogram, a kite does not have congruent opposite angles. Additionally, a kite has two pairs of adjacent sides that are congruent, while a parallelogram has all sides congruent.
A square has 4 congruent sides and 4 right angles, in addition to having all of the properties of a parallelogram. A kite is not a parallelogram. It has two pairs of consecutive congruent sides, and a pair of congruent opposite angles.
In geometry, a kite, or deltoid is a quadrilateral with two disjoint pairs of congruent adjacent sides, in contrast to a parallelogram, where the congruent sides are opposite.
No, except in the special case where each was a square.
Yes. They can form a kite.
a kite (two pairs of adjacent congruent sides) or a trapezoid (one pair of parallel sides).
yes a parallelogram is congruent
A kite is not a parallelogram because the parallelogram's angles are tilted and a kite isn't.
When Can. A. parallelogram become a kite
The parallelogram and the kite both fit that description.
In geometry a kite, or deltoid, is a quadrilateral with two disjoint pairs of congruent adjacent sides, in contrast to a parallelogram, where the congruent sides are opposite. The geometric object is named for the wind-blown, flying kite (itself named for a bird), which in its simple form often has this shape.
No. In a parallelogram, opposite angles are congruent.