Formula:
The formula is:
Variables:
Variable |
Meaning |
A |
Area of the kite (the total area enclosed by the kite) |
p |
Length of the first diagonal of the kite |
q |
Length of the second diagonal of the kite |
How to Calculate ?
First of all you have to measure the lengths of the two diagonals of the kite, p and q. Secondly, multiply these two lengths together. In the end, divide the product by 2 to calculate the area (A) of the kite.
Solved Calculation:
Example 1:
Given:
- Diagonal 1 (p) = 10 cm
- Diagonal 2 (q) = 8 cm
Calculation |
Instructions |
Step 1: A = |
Start with the formula. |
Step 2: A = |
Replace p with 10 cm and q with 8 cm. |
Step 3: A = |
Multiply 10 by 8 to get 80. |
Step 4: A = 40 cm² |
Divide 80 by 2 to get the area. |
Answer:
The area of the kite is 40 cm².
Example 2:
Given:
- Diagonal 1 (p) = 15 cm
- Diagonal 2 (q) = 12 cm
Calculation |
Instructions |
Step 1: A = |
Start with the formula. |
Step 2: A = |
Replace with 15 cm and with 12 cm. |
Step 3: A = |
Multiply 15 by 12 to get 180. |
Step 4: A = 90 cm² |
Divide 180 by 2 to get the area. |
Answer:
The area of the kite is 90 cm².
What is Kite Area ?
The area of a kite is simple and easy calculation that requires knowledge of the lengths of its diagonals. For those without diagonal measurements, there are other methods available. For that you have to know the lengths of the sides and the angle between them.
A kite area calculator makes these calculations easy. Not only for figuring out the basic area, the kite area calculator helps determine other related measurements too, like perimeter and angles. It’s knowledge is too critical in various fields including for geometry class problems, kite designing or kites related shapes. For every every shape, diagonal, regular or without diagonal, this calculator knows the answers.
Final Words:
The Kite Area Calculator helps calculate the area of a kite-shaped figure, which is a type of quadrilateral with two pairs of adjacent sides that are equal. By this, you can know the total area enclosed by the kite. It’s important in design, construction and in geometry.