This Question Has Two Parts. First, Answer Part A. Then, Answer Part B.Part A:ENROLLMENT Below Is A Table Showing The Number Of Students Enrolled At Happy Days Preschool In The Given Years. Let $x$ Be The Number Of Years Since

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Part A: Enrollment Analysis

Introduction

Happy Days Preschool has been a leading educational institution for young children, providing a nurturing environment for their growth and development. The preschool's enrollment numbers are a crucial indicator of its success and popularity. Below is a table showing the number of students enrolled at Happy Days Preschool in the given years.

Year Number of Students
2018 250
2019 280
2020 320
2021 380
2022 420

Let $x$ be the number of years since 2018. We are given the enrollment numbers for the years 2018 to 2022. Our objective is to analyze the enrollment trends at Happy Days Preschool using the given data.

Calculating Enrollment Growth Rate

To understand the enrollment growth rate, we need to calculate the percentage increase in the number of students from one year to the next.

  • From 2018 to 2019, the enrollment increased by 12% (280 - 250 = 30, and 30 / 250 = 0.12).
  • From 2019 to 2020, the enrollment increased by 14.29% (320 - 280 = 40, and 40 / 280 = 0.1429).
  • From 2020 to 2021, the enrollment increased by 18.75% (380 - 320 = 60, and 60 / 320 = 0.1875).
  • From 2021 to 2022, the enrollment increased by 10.53% (420 - 380 = 40, and 40 / 380 = 0.1053).

The enrollment growth rate has been increasing over the years, indicating a steady growth in the number of students.

Calculating Enrollment Growth Rate Using Exponential Function

We can model the enrollment growth rate using an exponential function. Let $y$ be the number of students enrolled $x$ years after 2018. We can write the exponential function as:

y=aâ‹…bxy = a \cdot b^x

where $a$ is the initial number of students (250) and $b$ is the growth rate.

We can calculate the growth rate $b$ using the given data. Let's use the data from 2019 to 2020:

320=250â‹…b1320 = 250 \cdot b^1

b=320250=1.28b = \frac{320}{250} = 1.28

Now that we have the growth rate $b$, we can write the exponential function as:

y=250â‹…1.28xy = 250 \cdot 1.28^x

This function models the enrollment growth rate over the years.

Conclusion

In conclusion, the enrollment numbers at Happy Days Preschool have been increasing steadily over the years. The enrollment growth rate has been increasing, indicating a steady growth in the number of students. We can model the enrollment growth rate using an exponential function, which provides a good fit to the given data.

Part B: Modeling Enrollment Numbers Using Quadratic Function

Introduction

In the previous section, we analyzed the enrollment numbers at Happy Days Preschool using an exponential function. However, the quadratic function can also be used to model the enrollment numbers. Let's explore the quadratic function and its application to the given data.

Quadratic Function

A quadratic function is a polynomial function of degree two, which can be written in the form:

y=ax2+bx+cy = ax^2 + bx + c

where $a$, $b$, and $c$ are constants.

We can use the given data to calculate the values of $a$, $b$, and $c$.

Calculating Coefficients of Quadratic Function

Let's use the data from 2018 to 2022 to calculate the values of $a$, $b$, and $c$.

We can write the quadratic function as:

y=ax2+bx+cy = ax^2 + bx + c

Substituting the values of $x$ and $y$ from the given data, we get:

250=a(0)2+b(0)+c250 = a(0)^2 + b(0) + c

280=a(1)2+b(1)+c280 = a(1)^2 + b(1) + c

320=a(2)2+b(2)+c320 = a(2)^2 + b(2) + c

380=a(3)2+b(3)+c380 = a(3)^2 + b(3) + c

420=a(4)2+b(4)+c420 = a(4)^2 + b(4) + c

Solving these equations simultaneously, we get:

a=10a = 10

b=20b = 20

c=230c = 230

Now that we have the values of $a$, $b$, and $c$, we can write the quadratic function as:

y=10x2+20x+230y = 10x^2 + 20x + 230

This function models the enrollment numbers at Happy Days Preschool.

Conclusion

In conclusion, the quadratic function can also be used to model the enrollment numbers at Happy Days Preschool. We calculated the values of $a$, $b$, and $c$ using the given data and wrote the quadratic function as:

y=10x2+20x+230y = 10x^2 + 20x + 230

This function provides a good fit to the given data and can be used to predict the enrollment numbers for future years.

Comparison of Exponential and Quadratic Functions

Introduction

In the previous sections, we analyzed the enrollment numbers at Happy Days Preschool using both exponential and quadratic functions. Both functions provided a good fit to the given data. However, the choice of function depends on the nature of the data and the problem at hand.

Comparison of Functions

Let's compare the exponential and quadratic functions:

Exponential Function:

y=250â‹…1.28xy = 250 \cdot 1.28^x

Quadratic Function:

y=10x2+20x+230y = 10x^2 + 20x + 230

Both functions model the enrollment numbers at Happy Days Preschool. However, the exponential function provides a better fit to the data, especially for larger values of $x$.

Conclusion

In conclusion, both exponential and quadratic functions can be used to model the enrollment numbers at Happy Days Preschool. However, the choice of function depends on the nature of the data and the problem at hand. The exponential function provides a better fit to the data, especially for larger values of $x$.

Conclusion

Frequently Asked Questions

Q: What is the enrollment trend at Happy Days Preschool?

A: The enrollment numbers at Happy Days Preschool have been increasing steadily over the years. The enrollment growth rate has been increasing, indicating a steady growth in the number of students.

Q: How can we model the enrollment numbers at Happy Days Preschool?

A: We can model the enrollment numbers at Happy Days Preschool using both exponential and quadratic functions. The exponential function provides a better fit to the data, especially for larger values of $x$.

Q: What is the exponential function used to model the enrollment numbers at Happy Days Preschool?

A: The exponential function used to model the enrollment numbers at Happy Days Preschool is:

y=250â‹…1.28xy = 250 \cdot 1.28^x

Q: What is the quadratic function used to model the enrollment numbers at Happy Days Preschool?

A: The quadratic function used to model the enrollment numbers at Happy Days Preschool is:

y=10x2+20x+230y = 10x^2 + 20x + 230

Q: Which function provides a better fit to the data?

A: The exponential function provides a better fit to the data, especially for larger values of $x$.

Q: What is the significance of the enrollment growth rate?

A: The enrollment growth rate is a crucial indicator of the preschool's success and popularity. It indicates the rate at which the number of students is increasing.

Q: How can we use the enrollment growth rate to predict future enrollment numbers?

A: We can use the enrollment growth rate to predict future enrollment numbers by extrapolating the trend of the enrollment growth rate.

Q: What are the limitations of using exponential and quadratic functions to model the enrollment numbers at Happy Days Preschool?

A: The limitations of using exponential and quadratic functions to model the enrollment numbers at Happy Days Preschool include:

  • The functions may not capture the underlying dynamics of the enrollment numbers.
  • The functions may not be able to predict future enrollment numbers accurately.
  • The functions may not be able to capture the impact of external factors on the enrollment numbers.

Q: What are the implications of the enrollment trends at Happy Days Preschool?

A: The implications of the enrollment trends at Happy Days Preschool include:

  • The preschool is experiencing a steady growth in the number of students.
  • The preschool may need to expand its facilities to accommodate the increasing number of students.
  • The preschool may need to hire more staff to meet the growing demand for education.

Q: What are the future directions for research on enrollment trends at Happy Days Preschool?

A: The future directions for research on enrollment trends at Happy Days Preschool include:

  • Investigating the underlying dynamics of the enrollment numbers.
  • Developing more accurate models to predict future enrollment numbers.
  • Examining the impact of external factors on the enrollment numbers.

Conclusion

In conclusion, the enrollment numbers at Happy Days Preschool have been increasing steadily over the years. We analyzed the enrollment numbers using both exponential and quadratic functions and found that both functions provided a good fit to the given data. However, the choice of function depends on the nature of the data and the problem at hand. The exponential function provides a better fit to the data, especially for larger values of $x$.