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A kite is inscribed in a square with a side length of 9 units.

What is the area of the kite?

27.5 square units
36.0 square units
40.5 square units
45.0 square units

A kite is inscribed in a square with a side length of 9 unitsWhat is the area of the kite275 square units360 square units405 square units450 square units class=

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nobrains
Hey there!

The area of a kite is A = (d1d2) / 2, where d1 and d2 are the diagonals of the kite.
Since the kite is inscribed in the square, and the sides of the square are 9 units, the diagonals of the kite are both 9 units.
d1 = 9 units
d2 = 9 units

A = (9units * 9units) / 2
A = 81units² / 2
A = 40.5 units²

Please comment with any questions!

The area of the kite that is inscribed in a square is 40.5 square units.

How do you calculate the area?

Given that the side length of the square in which the kite is inscribed is units. The area of a kite is calculated as given below.

[tex]A = \dfrac {1}{2}\times d_1\times d_2[/tex]

Where d1 and d2 are diagonals of the kite that are equivalent to the length of the square. Hence the area can be given as below.

[tex]A = \dfrac {1}{2}\times 9\times 9[/tex]

[tex]A = 40.5 [/tex]

Hence we can conclude that the area of the kite is 40.5 square units.

To know more about the area, follow the link given below.

https://brainly.com/question/16151549.