If Kris Makes $d$ Dollars And Heidi Makes 75 Dollars Less Than 3 Times Kris's Wage, What Does Heidi Make In Terms Of $d$?A. $ D + 75 D + 75 D + 75 [/tex] B. $d - 225$ C. $3d - 75$ D. $3d -

Understanding the Relationship Between Kris and Heidi's Wages

In this problem, we are given the information that Kris makes $d$ dollars and Heidi makes 75 dollars less than 3 times Kris's wage. We need to find out what Heidi makes in terms of $d$. To do this, we will first calculate 3 times Kris's wage and then subtract 75 dollars from it.

Calculating 3 Times Kris's Wage

To find 3 times Kris's wage, we simply multiply Kris's wage by 3. Since Kris makes $d$ dollars, 3 times Kris's wage is $3d$.

Subtracting 75 Dollars from 3 Times Kris's Wage

Now that we have 3 times Kris's wage, we need to subtract 75 dollars from it to find Heidi's wage. This can be represented as $3d - 75$.

Evaluating the Options

Let's evaluate the options given to see which one matches our calculation.

• Option A: $d + 75$ - This option does not take into account 3 times Kris's wage, so it is not correct.
• Option B: $d - 225$ - This option also does not take into account 3 times Kris's wage, so it is not correct.
• Option C: $3d - 75$ - This option matches our calculation, so it is the correct answer.
• Option D: $3d - 75$ - This option is the same as option C, so it is also the correct answer.

Conclusion

In conclusion, Heidi makes $3d - 75$ dollars in terms of $d$. This is because we calculated 3 times Kris's wage and then subtracted 75 dollars from it to find Heidi's wage.

Understanding the Relationship Between Kris and Heidi's Wages in Terms of Algebra

In this problem, we can also represent the relationship between Kris and Heidi's wages in terms of algebra. Let's say Kris's wage is represented by the variable $d$. Then, Heidi's wage can be represented as $3d - 75$.

Using Algebra to Represent the Relationship

Using algebra, we can represent the relationship between Kris and Heidi's wages as an equation. Let's say the equation is $h = 3d - 75$, where $h$ represents Heidi's wage and $d$ represents Kris's wage.

Solving for Heidi's Wage

To solve for Heidi's wage, we can plug in the value of $d$ into the equation. For example, if Kris makes $d = 100$ dollars, then Heidi's wage would be $h = 3(100) - 75 = 225$ dollars.

Evaluating the Options Using Algebra

Let's evaluate the options using algebra to see which one matches our calculation.

• Option A: $d + 75$ - This option does not take into account 3 times Kris's wage, so it is not correct.
• Option B: $d - 225$ - This option also does not take into account 3 times Kris's wage, so it is not correct.
• Option C: $3d - 75$ - This option matches our calculation, so it is the correct answer.
• Option D: $3d - 75$ - This option is the same as option C, so it is also the correct answer.

Conclusion

In conclusion, Heidi makes $3d - 75$ dollars in terms of $d$. This is because we calculated 3 times Kris's wage and then subtracted 75 dollars from it to find Heidi's wage.

Real-World Applications of Algebra

Algebra has many real-world applications, including finance, science, and engineering. In finance, algebra is used to calculate interest rates, investments, and loans. In science, algebra is used to model population growth, chemical reactions, and physical systems. In engineering, algebra is used to design and optimize systems, such as bridges, buildings, and electronic circuits.

Using Algebra to Model Real-World Problems

Algebra can be used to model real-world problems, such as the relationship between Kris and Heidi's wages. By representing the problem using algebra, we can solve for the unknown variable and find the solution.

Conclusion

In conclusion, algebra is a powerful tool that can be used to model and solve real-world problems. By representing the problem using algebra, we can solve for the unknown variable and find the solution.

Understanding the Relationship Between Kris and Heidi's Wages in Terms of Graphs

In this problem, we can also represent the relationship between Kris and Heidi's wages in terms of graphs. Let's say Kris's wage is represented by the variable $d$. Then, Heidi's wage can be represented as $3d - 75$.

Using Graphs to Represent the Relationship

Using graphs, we can represent the relationship between Kris and Heidi's wages as a line graph. The x-axis represents Kris's wage, and the y-axis represents Heidi's wage.

Plotting the Graph

To plot the graph, we can use the equation $h = 3d - 75$, where $h$ represents Heidi's wage and $d$ represents Kris's wage. We can plot the graph by plugging in different values of $d$ and finding the corresponding value of $h$.

Evaluating the Options Using Graphs

Let's evaluate the options using graphs to see which one matches our calculation.

• Option A: $d + 75$ - This option does not take into account 3 times Kris's wage, so it is not correct.
• Option B: $d - 225$ - This option also does not take into account 3 times Kris's wage, so it is not correct.
• Option C: $3d - 75$ - This option matches our calculation, so it is the correct answer.
• Option D: $3d - 75$ - This option is the same as option C, so it is also the correct answer.

Conclusion

In conclusion, Heidi makes $3d - 75$ dollars in terms of $d$. This is because we calculated 3 times Kris's wage and then subtracted 75 dollars from it to find Heidi's wage.

Real-World Applications of Graphs

Graphs have many real-world applications, including finance, science, and engineering. In finance, graphs are used to represent stock prices, interest rates, and investments. In science, graphs are used to model population growth, chemical reactions, and physical systems. In engineering, graphs are used to design and optimize systems, such as bridges, buildings, and electronic circuits.

Using Graphs to Model Real-World Problems

Graphs can be used to model real-world problems, such as the relationship between Kris and Heidi's wages. By representing the problem using graphs, we can solve for the unknown variable and find the solution.

Conclusion

In conclusion, graphs are a powerful tool that can be used to model and solve real-world problems. By representing the problem using graphs, we can solve for the unknown variable and find the solution.

Understanding the Relationship Between Kris and Heidi's Wages in Terms of Tables

In this problem, we can also represent the relationship between Kris and Heidi's wages in terms of tables. Let's say Kris's wage is represented by the variable $d$. Then, Heidi's wage can be represented as $3d - 75$.

Using Tables to Represent the Relationship

Using tables, we can represent the relationship between Kris and Heidi's wages as a table. The table can have two columns: one for Kris's wage and one for Heidi's wage.

Filling in the Table

To fill in the table, we can use the equation $h = 3d - 75$, where $h$ represents Heidi's wage and $d$ represents Kris's wage. We can fill in the table by plugging in different values of $d$ and finding the corresponding value of $h$.

Evaluating the Options Using Tables

Let's evaluate the options using tables to see which one matches our calculation.

• Option A: $d + 75$ - This option does not take into account 3 times Kris's wage, so it is not correct.
• Option B: $d - 225$ - This option also does not take into account 3 times Kris's wage, so it is not correct.
• Option C: $3d - 75$ - This option matches our calculation, so it is the correct answer.
• Option D: $3d - 75$ - This option is the same as option C, so it is also the correct answer.

Conclusion

In conclusion, Heidi makes $3d - 75$ dollars in terms of $d$. This is because we calculated 3 times Kris's wage and then subtracted 75 dollars from it to find Heidi's wage.

Real-World Applications of Tables

Tables have many real-world applications, including finance, science, and engineering. In finance, tables are used to represent stock prices, interest rates, and investments. In science, tables are used to model population growth, chemical reactions, and physical systems. In engineering, tables are used to design and optimize systems, such as bridges, buildings, and electronic circuits.

Using Tables to Model Real-World Problems

Tables can be used to model real-world problems, such as the relationship between Kris and Heidi's wages. By representing the problem using tables, we can solve for the unknown variable and find the solution.

Conclusion

In conclusion, tables are a powerful tool that can be used to model and solve real-world problems. By representing the problem using tables, we can solve for the unknown variable and find the solution.

Understanding the Relationship Between Kris and Heidi's Wages in Terms of Word Problems

In this problem
Q&A: Understanding the Relationship Between Kris and Heidi's Wages

In this article, we will answer some common questions related to the problem of understanding the relationship between Kris and Heidi's wages.

Q: What is the relationship between Kris and Heidi's wages?

A: The relationship between Kris and Heidi's wages is that Heidi makes 75 dollars less than 3 times Kris's wage.

Q: How can we represent the relationship between Kris and Heidi's wages in terms of algebra?

A: We can represent the relationship between Kris and Heidi's wages in terms of algebra using the equation $h = 3d - 75$, where $h$ represents Heidi's wage and $d$ represents Kris's wage.

Q: How can we use graphs to represent the relationship between Kris and Heidi's wages?

A: We can use graphs to represent the relationship between Kris and Heidi's wages by plotting a line graph with the x-axis representing Kris's wage and the y-axis representing Heidi's wage.

Q: How can we use tables to represent the relationship between Kris and Heidi's wages?

A: We can use tables to represent the relationship between Kris and Heidi's wages by creating a table with two columns: one for Kris's wage and one for Heidi's wage.

Q: What are some real-world applications of algebra, graphs, and tables?

A: Algebra, graphs, and tables have many real-world applications, including finance, science, and engineering. In finance, they are used to calculate interest rates, investments, and loans. In science, they are used to model population growth, chemical reactions, and physical systems. In engineering, they are used to design and optimize systems, such as bridges, buildings, and electronic circuits.

Q: How can we use algebra, graphs, and tables to model real-world problems?

A: We can use algebra, graphs, and tables to model real-world problems by representing the problem using one of these tools and then solving for the unknown variable.

Q: What is the correct answer to the problem of understanding the relationship between Kris and Heidi's wages?

A: The correct answer to the problem of understanding the relationship between Kris and Heidi's wages is $3d - 75$.

Q: Why is it important to understand the relationship between Kris and Heidi's wages?

A: It is important to understand the relationship between Kris and Heidi's wages because it can help us to make informed decisions about our finances and to understand how different variables can affect our wages.

Q: Can you provide an example of how to use algebra to solve a real-world problem?

A: Yes, here is an example of how to use algebra to solve a real-world problem:

Suppose we want to know how much money we will have in our savings account after 5 years if we deposit $100 per month and earn an interest rate of 5% per year. We can use algebra to solve this problem by creating an equation that represents the situation:

$$A = P(1 + r)^n$$

where $A$ is the amount of money in the account after $n$ years, $P$ is the principal amount (the initial deposit), $r$ is the interest rate, and $n$ is the number of years.

We can plug in the values we know into this equation and solve for $A$:

$$A = 100(1 + 0.05)^5$$

$$A = 100(1.05)^5$$

$$A = 100(1.2762815625)$$

$$A = 127.62815625$$

So, after 5 years, we will have approximately $127.63 in our savings account.

Q: Can you provide an example of how to use graphs to solve a real-world problem?

A: Yes, here is an example of how to use graphs to solve a real-world problem:

Suppose we want to know how the price of a product changes over time. We can use a graph to represent this situation by plotting a line graph with the x-axis representing time and the y-axis representing price.

We can use data from a company's sales reports to create this graph. For example, let's say the company's sales reports show that the price of the product was $10 in January, $12 in February, $15 in March, and $18 in April.

We can plot these data points on a graph and then draw a line through them to represent the trend in the data.

By looking at the graph, we can see that the price of the product is increasing over time. We can also use the graph to make predictions about future sales.

Q: Can you provide an example of how to use tables to solve a real-world problem?

A: Yes, here is an example of how to use tables to solve a real-world problem:

Suppose we want to know how the number of customers at a restaurant changes over time. We can use a table to represent this situation by creating a table with two columns: one for time and one for number of customers.

We can use data from the restaurant's customer reports to create this table. For example, let's say the customer reports show that the number of customers was 100 in January, 120 in February, 150 in March, and 180 in April.

We can fill in the table with these data points and then use the table to make predictions about future sales.

By looking at the table, we can see that the number of customers is increasing over time. We can also use the table to make predictions about future sales.

Conclusion

In conclusion, algebra, graphs, and tables are powerful tools that can be used to model and solve real-world problems. By representing the problem using one of these tools and then solving for the unknown variable, we can gain a deeper understanding of the situation and make informed decisions.