Examples with solutions for Area of a Rhombus: Using Pythagoras' theorem

Exercise #1

Using the rhombus in the drawing:

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Calculate the area?

Video Solution

Step-by-Step Solution

Remember there are two options to calculate the area of a rhombus:

1: The diagonal multiplied by the diagonal divided by 2.

2: The base multiplied by the height.

In the question, we are only given the data for one of the diagonals and one of the sides, which means we cannot use either of the above formulas.

We need to find more data. Let's begin by finding the second diagonal:

Remember that the diagonals of a rhombus are perpendicular to one another, which means that they form a 90-degree angle.

Therefore, all the triangles in a rhombus are right-angled.

Now we can focus on the triangle where the side and the height are given, and we will calculate the third side using the Pythagorean theorem:

a2+b2=c2 a²+b²=c² Insert the given data:

32+x2=52 3^2+x^2=5^2 9+x2=25 9+x^2=25 x2=259=16 x^2=25-9=16 x=16=4 x=\sqrt{16}=4

Now that we have found the second half of the diagonal, we can calculate the area of the rhombus by multiplying the two diagonals together.

Since the diagonals in a rhombus are perpendicular and cross each other, they are equal. Hence, our diagonals are equal:

3+3=6 3+3=6 4+4=8 4+4=8 Therefore, the area of the rhombus is:

6×82=482=24 \frac{6\times8}{2}=\frac{48}{2}=24

Answer

24

Exercise #2

Look at the rhombus in the figure.

Its area is 217 2\sqrt{17} cm².

Calculate X.

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Video Solution

Answer

22 2\sqrt{2} cm

Exercise #3

Look at the rhombus in the figure.

Calculate its area.

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Video Solution

Answer

162 16\sqrt{2} cm²

Exercise #4

Given the rhombus ABCD of the figure

Given the circle whose center O and radius 3.5 cm

Given CE=2

CE is perpendicular to DE

Calculate the area of the rhombus

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Video Solution

Answer

215 21\sqrt{5} cm².