In this article, we will learn what area is, and understand how it is calculated for each shape, in the most practical and simple way there is.
Shall we start?
In this article, we will learn what area is, and understand how it is calculated for each shape, in the most practical and simple way there is.
Shall we start?
Area is the definition of the size of something. In mathematics, which is precisely what interests us now, it refers to the size of some figure.
In everyday life, you have surely heard about area in relation to the surface of an apartment, plot of land, etc.
In fact, when they ask what the surface area of your apartment is, they are asking about its size and, instead of answering with words like "big" or "small" we can calculate its area and express it with units of measure. In this way, we can compare different sizes.
Large areas such as apartments are usually measured in meters, therefore, the unit of measurement will be square meter.
On the other hand, smaller figures are generally measured in centimeters, that is, the unit of measurement for the area will be square centimeter.
Remember:
Units of measurement for the area in
Units of measurement for the area
What is the area of the given triangle?
The width of a rectangle is equal to 15 cm and its length is 3 cm.
Calculate the area of the rectangle.
Calculate the area of the trapezoid.
Calculate the area of the triangle below, if possible.
Look at the rectangle ABCD below.
Side AB is 6 cm long and side BC is 4 cm long.
What is the area of the rectangle?
What is the area of the given triangle?
This question is a bit confusing. We need start by identifying which parts of the data are relevant to us.
Remember the formula for the area of a triangle:
The height is a straight line that comes out of an angle and forms a right angle with the opposite side.
In the drawing we have a height of 6.
It goes down to the opposite side whose length is 5.
And therefore, these are the data points that we will use.
We replace in the formula:
15
The width of a rectangle is equal to 15 cm and its length is 3 cm.
Calculate the area of the rectangle.
To calculate the area of the rectangle, we multiply the length by the width:
45
Calculate the area of the trapezoid.
We use the formula (base+base) multiplied by the height and divided by 2.
Note that we are only provided with one base and it is not possible to determine the size of the other base.
Therefore, the area cannot be calculated.
Cannot be calculated.
Calculate the area of the triangle below, if possible.
The formula to calculate the area of a triangle is:
(side * height corresponding to the side) / 2
Note that in the triangle provided to us, we have the length of the side but not the height.
That is, we do not have enough data to perform the calculation.
Cannot be calculated
Look at the rectangle ABCD below.
Side AB is 6 cm long and side BC is 4 cm long.
What is the area of the rectangle?
Remember that the formula for the area of a rectangle is width times height
We are given that the width of the rectangle is 6
and that the length of the rectangle is 4
Therefore we calculate:
6*4=24
24 cm²
Given the following rectangle:
Find the area of the rectangle.
Given the following rectangle:
Find the area of the rectangle.
Given the following rectangle:
Find the area of the rectangle.
Given the trapezoid:
What is the area?
Look at the circle in the figure:
The radius is equal to 7.
What is the area of the circle?
Given the following rectangle:
Find the area of the rectangle.
We will use the formula to calculate the area of a rectangle: length times width
54
Given the following rectangle:
Find the area of the rectangle.
Let's calculate the area of the rectangle by multiplying the length by the width:
32
Given the following rectangle:
Find the area of the rectangle.
Let's calculate the area of the rectangle by multiplying the length by the width:
77
Given the trapezoid:
What is the area?
Formula for the area of a trapezoid:
We substitute the data into the formula and solve:
52.5
Look at the circle in the figure:
The radius is equal to 7.
What is the area of the circle?
Remember that the formula for the area of a circle is
πR²
We replace the data we know:
π7²
π49
49π
Given the rhombus in the drawing:
What is the area?
Look at the square below:
What is the area of the square?
Given the square:
What is the area of the square?
Look at the square below:
What is the area of the square?
Look at the square below:
What is the area of the square?
Given the rhombus in the drawing:
What is the area?
Let's remember that there are two ways to calculate the area of a rhombus:
The first is the side times the height of the side.
The second is diagonal times diagonal divided by 2.
Since we are given both diagonals, we calculate it the second way:
14
Look at the square below:
What is the area of the square?
The area of the square is equal to the side of the square raised to the second power.
That is:
Since the drawing gives us one side of the square, and in a square all sides are equal, we will solve the area of the square as follows:
Given the square:
What is the area of the square?
The area of the square is equal to the side of the square raised to the second power.
That is:
Since the drawing gives us one side of the square, and in a square all sides are equal, we will solve the area of the square as follows:
Look at the square below:
What is the area of the square?
The area of the square is equal to the side of the square raised to the second power.
That is:
Since the diagram provides us with one side of the square, and in a square all sides are equal, we will solve the area of the square as follows:
Look at the square below:
What is the area of the square?
The area of the square is equal to the side of the square raised to the second power.
That is:
Since the drawing gives us one side of the square, and in a square all sides are equal, we will solve the area of the square as follows: