Types of Quadrilaterals
A kite is a quadrilateral with the following properties:
- Exactly two pairs of consecutive congruent sides (AB = AD and BC = DC)
- One pair of opposite angles are congruent (ZABC= ZADC)
- Diagonals are perpendicular (AC ⊥ BD)
Properties of Kites in Quadrilaterals Class 9
If each quadrilateral below is a kite, find the missing values.
Properties of Kites in Quadrilaterals Worksheet
If WX= 14 and WR = 8, find RZ.
x²+8²=14²
x²=132
X=11.5
RZ=11.5
If AC = 38 and ED= 41, find CD.
192+41²=X²
2042=X2
X=45.2
CD= 45.2
If RS= 10 and RU= 9, find QS.
92+x²=10²
X²=19
X=4.4
QS = 2(4.4) 8.8
Properties of Kite Angles
- m/QRT= 37°
- m/LPTQ = 90°
- angles in a kite add up to 360
- mZPQT=53°
- m/3 = 25°
- m/4= 46°
- m/2= 44°
- m25 = m26 = 38°
- m27 = 52°
Finding Missing Values in Kites Worksheet
Solve for x.
13x-32=1x +22
6x = 54
X=9
Solve for x.
8X=120
X=15
Find mZFGJ.
5x-1=2x +11
3x=12
X=4
M²FGJ = 171°
Find mZSTV.
5x+14+ 3x+8+ 2 (109) = 360
8x + 240=360
M²STV = 28°
Find mZNQP.
15x=120
X=8
m²PQR=25°
mLNQP 2501
Kite Angle Calculator
- Kite angle formula
- How to find the angles of a kite with one angle
- Find the value of x in a kite calculator
Finding Missing Values in Kites Formula
- mZJ=82°
- mZK = 125°
- m/ZGDE = 118⁰
- m/ZDEH = 31°
- mZDGH = 44°
- m21 = 38°
- m24 = 65°
- m25= 73°
- m26= 38°
- m27 = 52°
Solving for x in Kite Geometry Worksheet
- 5x-1=2x +11
- 3x=12
- X=4
Kite Formula and Area of Kite
- Kite formula
- Area of kite
Ⓒ Gina Wilson (All Things Algebra, LLC), 2014-2019
By organizing the content into different headings and paragraphs, the properties of kites in quadrilaterals, as well as the formulas and calculations involved when finding missing values, angles, and lengths in kites, are now more accessible and understandable.