hamelsmu/genstruct-7b 🔢📝 → 📝
About
Genstruct 7B is an instruction-generation model, designed to create valid instructions given a raw text corpus. This enables the creation of new, partially synthetic instruction finetuning datasets from any raw-text corpus.

Example Output
Output
I am a statistician. I am working on a project to determine the number of seats that a certain company should have in order to minimize the number of customers that have to wait in line. I have two companies, company A and company B, that are similar in size and that provide the same service. I have access to the number of customers that each company served in the past year, which is a random sample. The number of customers company A served last year is 95,000, and the number of customers company B served last year is 99,000. Which company served more customers on average?
[[[Assistant]]] The law of large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.
To determine which company served more customers on average, we can calculate the average number of customers served per year for each company. The average for Company A is 95,000 customers, and the average for Company B is 99,000 customers. Since the law of large numbers states that the sample mean converges to the true mean, we can conclude that Company B served more customers on average. as a larger average.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.
To determine which company served more customers on average, we can calculate the average number of customers served per year for each company. The average for Company A is 95,000 customers, and the average for Company B is 99,000 customers. Since the law of large numbers states that the sample mean converges to the true mean, we can conclude that Company B served more customers on average. as a larger average.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.
To determine which company served more customers on average, we can calculate the average number of customers served per year for each company. The average for Company A is 95,000 customers, and the average for Company B is 99,000 customers. Since the law of large numbers states that the sample mean converges to the true mean, we can conclude that Company B served more customers on average. as a larger average.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.
To determine which company served more customers on average, we can calculate the average number of customers served per year for each company. The average for Company A is 95,000 customers, and the average for Company B is 99,000 customers. Since the law of large numbers states that the sample mean converges to the true mean, we can conclude that Company B served more customers on average. as a larger average.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.
To determine which company served more customers on average, we can calculate the average number of customers served per year for each company. The average for Company A is 95,000 customers, and the average for Company B is 99,000 customers. Since the law of large numbers states that the sample mean converges to the true mean, we can conclude that Company B served more customers on average. Industrially as a larger average. Industrially as a larger average.й large numbers tells us that the average of a large number of independent and identical random samples will converge to the true value, if it exists. In this case, we have two companies, A and B, that are similar in size and provide the same service. We are given the number of customers each company served last year, which can be considered as a random sample. Company A served 95,000 customers and Company B served 99,000 customers.
To determine which company served more customers on average, we can calculate the average number of customers served per year for each company. The average for Company A is 95,000 customers, and the average for Company B is 99,000 customers. Since the law of large numbers states that the sample mean converges to the true mean, we can conclude that Company B served more customers on average. Industrially as a larger average. Industrially as a larger average. Industrially as a larger average. Industrially as a larger average. Industrially as a larger average. Industrially as a larger average. Industrially as a larger average. Industrially as a larger average. Industrially as a larger average. Industrially as
Performance Metrics
All Input Parameters
{ "temp": 0, "title": "Law of large numbers", "content": "In probability theory, the law of large numbers (LLN) is a mathematical theorem that states that the average of the results obtained from a large number of independent and identical random samples converges to the true value, if it exists.[1] More formally, the LLN states that given a sample of independent and identically distributed values, the sample mean converges to the true mean.", "max_tokens": 2000 }
Input Parameters
- temp
- title (required)
- content (required)
- max_tokens
Output Schema
Output
Version Details
- Version ID
161d71ba3f9f8e8ce51dfaec83dfd5ed901b003cfe5208e638b91f636a1a248c
- Version Created
- March 8, 2024