The area of the kite can be calculated by multiplying the lengths of the diagonals and dividing this product by .
The area of the kite can be calculated by multiplying the lengths of the diagonals and dividing this product by .
To facilitate the understanding of the concept of calculus, you can use the following drawing and the accompanying formula:
Look at the deltoid in the figure:
What is its area?
Look at the deltoid in the figure:
What is its area?
ACBD is a deltoid.
AD = AB
CA = CB
Given in cm:
AB = 6
CD = 10
Calculate the area of the deltoid.
ABDC is a deltoid.
AB = BD
DC = CA
AD = 12 cm
CB = 16 cm
Calculate the area of the deltoid.
Shown below is the deltoid ABCD.
The diagonal AC is 8 cm long.
The area of the deltoid is 32 cm².
Calculate the diagonal DB.
Look at the deltoid in the figure:
What is its area?
Let's begin by reminding ourselves of the formula for the area of a kite
Both these values are given to us in the figure thus we can insert them directly into the formula:
(4*7)/2
28/2
14
14
Look at the deltoid in the figure:
What is its area?
To solve the exercise, we need to know the formula for calculating the area of a kite:
It's also important to know that a concave kite, like the one in the question, has one of its diagonals outside the shape - but it's still its diagonal.
Let's plug the data from the question into the formula:
(6*5)/2=
30/2=
15
15
ACBD is a deltoid.
AD = AB
CA = CB
Given in cm:
AB = 6
CD = 10
Calculate the area of the deltoid.
To solve the exercise, we first need to remember how to calculate the area of a rhombus:
(diagonal * diagonal) divided by 2
Let's plug in the data we have from the question
10*6=60
60/2=30
And that's the solution!
30
ABDC is a deltoid.
AB = BD
DC = CA
AD = 12 cm
CB = 16 cm
Calculate the area of the deltoid.
First, let's recall the formula for the area of a rhombus:
(Diagonal 1 * Diagonal 2) divided by 2
Now we will substitute the known data into the formula, giving us the answer:
(12*16)/2
192/2=
96
96 cm²
Shown below is the deltoid ABCD.
The diagonal AC is 8 cm long.
The area of the deltoid is 32 cm².
Calculate the diagonal DB.
First, we recall the formula for the area of a kite: multiply the lengths of the diagonals by each other and divide the product by 2.
We substitute the known data into the formula:
We reduce the 8 and the 2:
Divide by 4
8 cm
The deltoid below has an area of 60 cm².
What is the value of X?
The kite ABCD shown below has an area of 42 cm².
AB = BC
DC = AD
BD = 14
The diagonals of the kite intersect at point 0.
Calculate the length of side AO.
Given the deltoid ABCD
The main diagonal is equal to 2a+2
Secondary diagonal is equal to a
The area of the deltoid equals 6a
Calculate a a
A deltoid-shaped stage is to be built in a rectangular field.
The length of the field is 30 m and the width is 20 m.
What is the area of the stage shaded in orange?
Look at the kite ABCD below.
Diagonal DB = 10
CB = 4
Is it possible to calculate the area of the kite? If so, what is it?
The deltoid below has an area of 60 cm².
What is the value of X?
To solve the problem, we need to remember the formula for the area of a rhombus:
The product of the diagonals multiplied together and divided by 2.
Let's plug in the data we have into the formula:
(8*X)=60
2
Note that we can simplify the fraction, thus eliminating the denominator:
4X=60
Let's divide the equation by 4
X=15
15
The kite ABCD shown below has an area of 42 cm².
AB = BC
DC = AD
BD = 14
The diagonals of the kite intersect at point 0.
Calculate the length of side AO.
We substitute the data we have into the formula for the area of the kite:
We multiply by 2 to remove the denominator:
Then divide by 14:
In a rhombus, the main diagonal crosses the second diagonal, therefore:
3 cm
Given the deltoid ABCD
The main diagonal is equal to 2a+2
Secondary diagonal is equal to a
The area of the deltoid equals 6a
Calculate a a
To solve the question, we first need to remember the formula for the area of a kite:
Diagonal * Diagonal / 2
This means that if we substitute the given data we can see that:
a(2a+2)/2 = area of the kite
Let's remember that we are also given the area, so we'll put that in the equation too
a(2a+2)/2 = 6a
Now we have an equation that we can easily solve.
First, let's get rid of the fraction, so we'll multiply both sides of the equation by 2
a(2a+2)=6a*2
a(2a+2)=12a
Let's expand the parentheses on the left side of the equation
2a²+2a=12a
2a²=10a
Let's divide both sides of the equation by a
2a=10
Let's divide again by 2
a=5
And that's the solution!
5 cm
A deltoid-shaped stage is to be built in a rectangular field.
The length of the field is 30 m and the width is 20 m.
What is the area of the stage shaded in orange?
We can calculate the area of rectangle ABCD like so:
Now let's divide the deltoid along its length and width and add the following points:
Finally, we can calculate the area of deltoid PMNK as follows:
300 m
Look at the kite ABCD below.
Diagonal DB = 10
CB = 4
Is it possible to calculate the area of the kite? If so, what is it?
It is not possible.
Given the deltoid ABCD
Find the area
Given the deltoid ABCD
Find the area
Given the deltoid ABCD
Find the area
Given the deltoid ABCD
Find the area
Given the deltoid ABCD
Find the area
Given the deltoid ABCD
Find the area
cm².
Given the deltoid ABCD
Find the area
cm².
Given the deltoid ABCD
Find the area
cm².
Given the deltoid ABCD
Find the area
cm².
Given the deltoid ABCD
Find the area
cm².