DO this:
Take 450=1/2(25+x)
then you will get your answer i am in h. geo too!1 So its easy to me .. just remember that!
The formula for the area of a kite is 1/2 * d1 * d2. d1 is the first diagonal, and d2 is the second diagonal.
a quadrilateral in which diagonal are not congruent and larger diagonal is perpendicular bisector of smaller diagonal then it is known as kite
Both are quadrilaterals. Both have two pairs of side of equal length. In a kite they are adjacent sides, in a rectangle they are opposite. A kite has one pair of equal angles, all of a rectangle's angles are equal. In a kite, one diagonals bisects the other, in a rectangle both do.
The longer diagonal bisects the shorter diagonal.
It is a rhombus or a kite
6.2
The formula for the area of a kite is 1/2 * d1 * d2. d1 is the first diagonal, and d2 is the second diagonal.
Yes, in the figure of a kite one diagonal bisects the other. They do not bisect each other.
No, a kite does not have all its sides the same length. A kite typically has two pairs of adjacent sides that are equal in length. While the longer diagonal of a kite bisects the shorter diagonal at a right angle, the sides are not all congruent like in a rhombus.
Yes and at right angles
The area of a v kite is 1/2 diagonal 1 times diagonal 2 :) hope this helps :D
A quadrilateral in which diagonal are not congruent and only larger diagonal is perpendicular bisector of smaller diagonal then it is known as kite -- Mohan S. Vighe
Area of a kite in square units = 0.5 times the product of its diagonals
Yes: one of them, but the other diagonal does not.
1) Diagonals intersect at right angles. 2) The diagonal bisecting the angle between the two longer sides also bisects the other diagonal. 3 The area of a kite = the product of both diagonals ÷ 2.
No, they do not. Only the longer diagonal bisects the shorter diagonal.
Yes, the diagonals of a kite intersect at right angles (90 degrees). In a kite, one diagonal connects the vertices of the two pairs of equal-length sides, while the other diagonal connects the vertices of the unequal angles. This unique property of kites ensures that the diagonals are perpendicular to each other.