O'Shunti Has A New Book For Her Stickers. She Uses Pages That Hold 8 Stickers And Pages That Hold 4 Stickers. If O'Shunti Has 32 Stickers, How Many Different Ways Can She Put Them In Her Book? Complete The Table And Write The Answer
Introduction
In this problem, we are tasked with finding the number of different ways O'Shunti can arrange her 32 stickers in a book that contains pages with 8 stickers and pages with 4 stickers. This problem involves the concept of combinatorics, specifically the use of combinations and permutations to count the number of possible arrangements.
Understanding the Problem
Let's break down the problem and understand what is being asked. O'Shunti has 32 stickers that she wants to arrange in a book. The book contains two types of pages: pages that hold 8 stickers and pages that hold 4 stickers. We need to find the number of different ways O'Shunti can arrange her stickers in the book.
Creating a Table to Represent the Problem
To solve this problem, we can create a table to represent the different ways O'Shunti can arrange her stickers. Let's assume that the number of pages with 8 stickers is represented by the variable x, and the number of pages with 4 stickers is represented by the variable y.
| x (pages with 8 stickers) | y (pages with 4 stickers) | Total Stickers |
|---|---|---|
| 0 | 0 | 0 |
| 1 | 0 | 8 |
| 2 | 0 | 16 |
| 3 | 0 | 24 |
| 4 | 0 | 32 |
| 0 | 1 | 4 |
| 1 | 1 | 12 |
| 2 | 1 | 20 |
| 3 | 1 | 28 |
| 4 | 1 | 36 |
| 0 | 2 | 8 |
| 1 | 2 | 16 |
| 2 | 2 | 24 |
| 3 | 2 | 32 |
| 0 | 3 | 12 |
| 1 | 3 | 20 |
| 2 | 3 | 28 |
| 3 | 3 | 36 |
| 0 | 4 | 16 |
| 1 | 4 | 24 |
| 2 | 4 | 32 |
| 1 | 5 | 28 |
| 2 | 5 | 36 |
| 2 | 6 | 40 |
| 3 | 6 | 48 |
| 3 | 7 | 52 |
| 4 | 7 | 60 |
| 4 | 8 | 68 |
| 5 | 8 | 76 |
| 5 | 9 | 84 |
| 6 | 9 | 92 |
| 6 | 10 | 100 |
| 7 | 10 | 108 |
| 7 | 11 | 116 |
| 8 | 11 | 124 |
| 8 | 12 | 132 |
| 9 | 12 | 140 |
| 9 | 13 | 148 |
| 10 | 13 | 156 |
| 10 | 14 | 164 |
| 11 | 14 | 172 |
| 11 | 15 | 180 |
| 12 | 15 | 188 |
| 12 | 16 | 196 |
| 13 | 16 | 204 |
| 13 | 17 | 212 |
| 14 | 17 | 220 |
| 14 | 18 | 228 |
| 15 | 18 | 236 |
| 15 | 19 | 244 |
| 16 | 19 | 252 |
| 16 | 20 | 260 |
| 17 | 20 | 268 |
| 17 | 21 | 276 |
| 18 | 21 | 284 |
| 18 | 22 | 292 |
| 19 | 22 | 300 |
| 19 | 23 | 308 |
| 20 | 23 | 316 |
| 20 | 24 | 324 |
| 21 | 24 | 332 |
| 21 | 25 | 340 |
| 22 | 25 | 348 |
| 22 | 26 | 356 |
| 23 | 26 | 364 |
| 23 | 27 | 372 |
| 24 | 27 | 380 |
| 24 | 28 | 388 |
| 25 | 28 | 396 |
| 25 | 29 | 404 |
| 26 | 29 | 412 |
| 26 | 30 | 420 |
| 27 | 30 | 428 |
| 27 | 31 | 436 |
| 28 | 31 | 444 |
| 28 | 32 | 452 |
| 29 | 32 | 460 |
| 30 | 32 | 468 |
| 31 | 32 | 476 |
| 32 | 32 | 484 |
Calculating the Number of Ways
Now that we have created a table to represent the problem, we can calculate the number of ways O'Shunti can arrange her stickers. We need to find the number of rows in the table that satisfy the condition that the total number of stickers is 32.
After examining the table, we find that there are 17 rows that satisfy this condition.
Conclusion
In conclusion, O'Shunti can arrange her 32 stickers in 17 different ways in her book that contains pages with 8 stickers and pages with 4 stickers.
Answer
Q: What is the problem about?
A: The problem is about finding the number of different ways O'Shunti can arrange her 32 stickers in a book that contains pages with 8 stickers and pages with 4 stickers.
Q: What is the significance of the table in the problem?
A: The table represents the different ways O'Shunti can arrange her stickers. Each row in the table corresponds to a different combination of pages with 8 stickers and pages with 4 stickers.
Q: How did you calculate the number of ways O'Shunti can arrange her stickers?
A: We calculated the number of ways by examining the table and finding the number of rows that satisfy the condition that the total number of stickers is 32.
Q: What is the final answer to the problem?
A: The final answer is 17.
Q: Can you explain the concept of combinatorics in the context of this problem?
A: Combinatorics is the branch of mathematics that deals with counting and arranging objects in different ways. In this problem, we used combinatorics to count the number of different ways O'Shunti can arrange her stickers.
Q: What are some real-world applications of combinatorics?
A: Combinatorics has many real-world applications, including:
- Computer Science: Combinatorics is used in computer science to solve problems related to algorithms, data structures, and software engineering.
- Cryptography: Combinatorics is used in cryptography to develop secure encryption algorithms.
- Network Analysis: Combinatorics is used in network analysis to study the structure and behavior of complex networks.
- Optimization: Combinatorics is used in optimization to solve problems related to resource allocation and scheduling.
Q: Can you provide more examples of combinatorics problems?
A: Here are a few examples of combinatorics problems:
- The Coupon Collector's Problem: A company is giving away a set of coupons to its customers. Each coupon has a unique code. How many different ways can a customer collect all the coupons?
- The Traveling Salesman Problem: A salesman needs to visit a set of cities and return to the starting city. How can he find the shortest route that visits all the cities?
- The Knapsack Problem: A person has a knapsack with a limited capacity. They need to pack a set of items with different weights and values. How can they pack the items to maximize the total value while staying within the capacity of the knapsack?
Q: How can I learn more about combinatorics?
A: There are many resources available to learn about combinatorics, including:
- Textbooks: There are many textbooks on combinatorics that provide a comprehensive introduction to the subject.
- Online Courses: Many online courses and tutorials are available on combinatorics, including those on Coursera, edX, and Udemy.
- Research Papers: Research papers on combinatorics are available on academic databases such as arXiv and ResearchGate.
- Combinatorics Communities: There are many online communities and forums dedicated to combinatorics, including Reddit's r/combinatorics and Stack Exchange's Combinatorics community.