Let $y = 3t + 6$ Be A Linear Function Representing The Distance, In Feet, From Home For An Ant $t$ Minutes After Starting Out From A Location Near Its Home. What Does The Number 3 Represent In This Function?A. The Ant Started Out 3

Introduction

In the given linear function, $y = 3t + 6$, the variable $y$ represents the distance, in feet, from home for an ant $t$ minutes after starting out from a location near its home. The function is a simple linear equation that describes the relationship between the time elapsed and the distance traveled by the ant. In this article, we will focus on understanding the significance of the number 3 in this function.

The Number 3 in the Linear Function

The number 3 in the linear function $y = 3t + 6$ represents the rate at which the ant is traveling away from its home. In other words, it is the speed of the ant. To understand this, let's break down the function.

Speed and Rate of Change

In a linear function, the rate of change is represented by the coefficient of the variable. In this case, the coefficient of $t$ is 3. This means that for every minute that passes, the ant travels 3 feet away from its home. Therefore, the number 3 represents the speed of the ant.

Interpretation of the Number 3

The number 3 can be interpreted in several ways:

• Speed: As mentioned earlier, the number 3 represents the speed of the ant. It is the rate at which the ant is traveling away from its home.
• Rate of Change: The number 3 also represents the rate of change of the distance with respect to time. It is the change in distance per unit time.
• Slope: In a linear function, the slope represents the rate of change of the dependent variable with respect to the independent variable. In this case, the slope is 3, which represents the rate of change of the distance with respect to time.

Conclusion

In conclusion, the number 3 in the linear function $y = 3t + 6$ represents the speed of the ant, the rate of change of the distance with respect to time, and the slope of the linear function. It is an essential component of the function that helps us understand the relationship between the time elapsed and the distance traveled by the ant.

Example Use Case

Suppose we want to find the distance traveled by the ant after 5 minutes. We can plug in $t = 5$ into the function:

$y = 3(5) + 6$ $y = 15 + 6$ $y = 21$

Therefore, after 5 minutes, the ant has traveled 21 feet away from its home.

Key Takeaways

• The number 3 in the linear function $y = 3t + 6$ represents the speed of the ant.
• The number 3 also represents the rate of change of the distance with respect to time.
• The number 3 is the slope of the linear function.

Q: What is the initial distance of the ant from its home?

A: The initial distance of the ant from its home is represented by the constant term in the linear function, which is 6. This means that when the ant starts out from its location near its home, it is 6 feet away from its home.

Q: How fast is the ant traveling away from its home?

A: The ant is traveling away from its home at a speed of 3 feet per minute. This is represented by the coefficient of the variable t in the linear function, which is 3.

Q: What is the relationship between the time elapsed and the distance traveled by the ant?

A: The relationship between the time elapsed and the distance traveled by the ant is represented by the linear function y = 3t + 6. This function shows that for every minute that passes, the ant travels 3 feet away from its home.

Q: Can the ant travel in the opposite direction?

A: Yes, the ant can travel in the opposite direction. If the coefficient of the variable t in the linear function is negative, it would represent the ant traveling in the opposite direction.

Q: How can we find the distance traveled by the ant after a certain time?

A: To find the distance traveled by the ant after a certain time, we can plug in the value of t into the linear function. For example, if we want to find the distance traveled by the ant after 5 minutes, we can plug in t = 5 into the function y = 3t + 6.

Q: What is the significance of the slope in the linear function?

A: The slope in the linear function represents the rate of change of the distance with respect to time. In this case, the slope is 3, which represents the rate of change of the distance with respect to time.

Q: Can we use the linear function to model other real-world situations?

A: Yes, we can use the linear function to model other real-world situations where there is a direct relationship between two variables. For example, we can use the linear function to model the relationship between the amount of money spent and the number of items purchased.

Q: How can we determine if a linear function is a good model for a real-world situation?

A: We can determine if a linear function is a good model for a real-world situation by checking if the relationship between the variables is linear and if the function accurately represents the data.

Q: What are some common applications of linear functions in real-world situations?

A: Some common applications of linear functions in real-world situations include:

• Modeling the relationship between the amount of money spent and the number of items purchased
• Modeling the relationship between the distance traveled and the time elapsed
• Modeling the relationship between the cost of a product and the quantity produced
• Modeling the relationship between the temperature and the altitude

By understanding the linear function representing the ant's distance from home, we can gain insights into the behavior of the ant and its movement away from its home. We can also apply the concepts learned from this function to model other real-world situations.