hamelsmu / genstruct-7b

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.

Cold

Public
172 runs
L40S

Iterate in playground

Run with an API

Playground API Examples README Versions

Prediction

hamelsmu/genstruct-7b:62e716be8006a43e858b3e7cba5770e7aafa310539b3d2a379dd33a246bbdcf6

Model

hamelsmu/genstruct-7b:62e716be

qsypk33bkah5lflfq2yffqugxq

Status

Succeeded

Source

Web

Hardware

A40 (Large)

Total duration

82.2s

Created

over 1 year ago

Input

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

{
  "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
}

Install Replicate’s Node.js client library:

npm install replicate

Import and set up the client:

import Replicate from "replicate";

const replicate = new Replicate({
  auth: process.env.REPLICATE_API_TOKEN,
});

Run hamelsmu/genstruct-7b using Replicate’s API. Check out the model's schema for an overview of inputs and outputs.

const output = await replicate.run(
  "hamelsmu/genstruct-7b:62e716be8006a43e858b3e7cba5770e7aafa310539b3d2a379dd33a246bbdcf6",
  {
    input: {
      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
    }
  }
);

console.log(output);

To learn more, take a look at the guide on getting started with Node.js.

Install Replicate’s Python client library:

pip install replicate

Import the client:

import replicate

Run hamelsmu/genstruct-7b using Replicate’s API. Check out the model's schema for an overview of inputs and outputs.

output = replicate.run(
    "hamelsmu/genstruct-7b:62e716be8006a43e858b3e7cba5770e7aafa310539b3d2a379dd33a246bbdcf6",
    input={
        "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
    }
)
print(output)

To learn more, take a look at the guide on getting started with Python.

Run hamelsmu/genstruct-7b using Replicate’s API. Check out the model's schema for an overview of inputs and outputs.

curl -s -X POST \
  -H "Authorization: Bearer $REPLICATE_API_TOKEN" \
  -H "Content-Type: application/json" \
  -H "Prefer: wait" \
  -d $'{
    "version": "hamelsmu/genstruct-7b:62e716be8006a43e858b3e7cba5770e7aafa310539b3d2a379dd33a246bbdcf6",
    "input": {
      "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
    }
  }' \
  https://api.replicate.com/v1/predictions

To learn more, take a look at Replicate’s HTTP API reference docs.

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

{
  "completed_at": "2024-03-08T05:03:48.986963Z",
  "created_at": "2024-03-08T05:02:26.830993Z",
  "data_removed": false,
  "error": null,
  "id": "qsypk33bkah5lflfq2yffqugxq",
  "input": {
    "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
  },
  "logs": null,
  "metrics": {
    "predict_time": 48.577139,
    "total_time": 82.15597
  },
  "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?\n[[[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. \n\nTo 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. \n\nTo 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.\n\nTo 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.\n\nTo 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.\n\nTo 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.\n\nTo 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",
  "started_at": "2024-03-08T05:03:00.409824Z",
  "status": "succeeded",
  "urls": {
    "get": "https://api.replicate.com/v1/predictions/qsypk33bkah5lflfq2yffqugxq",
    "cancel": "https://api.replicate.com/v1/predictions/qsypk33bkah5lflfq2yffqugxq/cancel"
  },
  "version": "62e716be8006a43e858b3e7cba5770e7aafa310539b3d2a379dd33a246bbdcf6"
}

Generated in

48.6 seconds

Tweak it Share Report

Want to make some of these yourself?

Run this model