Linear functions are mathematical equations that describe a straight line. They are often used in various fields, such as finance, engineering, and science, to model and analyze data. In this report, we will present a linear function that describes the relation between the number of units sold and the total revenue of a company.
II. Table
Number of Units Sold (x)
10
20
30
40
50
Total Revenue (y)
$500
$1000
$1500
$2000
$2500
III. Graph
[Graph not included in text]
IV. Description or discussion about the graph and table.
From the table and graph, it can be seen that the data points form a straight line. By analyzing the data, we can conclude that the total revenue of the company increases as the number of units sold increases. The linear function that describes this relationship can be represented by the equation y = 50x, where y is the total revenue and x is the number of units sold.
This equation can be interpreted as for every unit sold, the company earns $50 in revenue.
V. Reflections
Linear functions are a useful tool in understanding and analyzing data. In this case, we can see that the linear function helps us understand the relationship between the number of units sold and the total revenue of a company. This information can be used to make important business decisions, such as setting prices or determining production levels. Understanding linear functions can also be useful in other areas such as economics, engineering, and even in our daily lives.
Answers & Comments
Step-by-step explanation:
I. Introduction
Linear functions are mathematical equations that describe a straight line. They are often used in various fields, such as finance, engineering, and science, to model and analyze data. In this report, we will present a linear function that describes the relation between the number of units sold and the total revenue of a company.
II. Table
Number of Units Sold (x)
10
20
30
40
50
Total Revenue (y)
$500
$1000
$1500
$2000
$2500
III. Graph
[Graph not included in text]
IV. Description or discussion about the graph and table.
From the table and graph, it can be seen that the data points form a straight line. By analyzing the data, we can conclude that the total revenue of the company increases as the number of units sold increases. The linear function that describes this relationship can be represented by the equation y = 50x, where y is the total revenue and x is the number of units sold.
This equation can be interpreted as for every unit sold, the company earns $50 in revenue.
V. Reflections
Linear functions are a useful tool in understanding and analyzing data. In this case, we can see that the linear function helps us understand the relationship between the number of units sold and the total revenue of a company. This information can be used to make important business decisions, such as setting prices or determining production levels. Understanding linear functions can also be useful in other areas such as economics, engineering, and even in our daily lives.