```
library(tidyverse)
library(tidymodels)
library(skimr)
library(gt) # for tables
<- read_csv(file = "data/chipotle.csv") chipotle
```

# How much food do you get when you order Chipotle?

Inspired by this Reddit post, we will explore the differences in the weight of Chipotle orders. The data was originally collected by Zackary Smigel, and a cleaned copy be found in `data/chipotle.csv`

.

Throughout the application exercise we will use the **infer** package which is part of **tidymodels** to estimate our bootstrap confidence intervals (CIs).

`skim(chipotle)`

Name | chipotle |

Number of rows | 30 |

Number of columns | 7 |

_______________________ | |

Column type frequency: | |

character | 4 |

Date | 1 |

numeric | 2 |

________________________ | |

Group variables | None |

**Variable type: character**

skim_variable | n_missing | complete_rate | min | max | empty | n_unique | whitespace |
---|---|---|---|---|---|---|---|

order | 0 | 1 | 6 | 6 | 0 | 2 | 0 |

meat | 0 | 1 | 7 | 8 | 0 | 2 | 0 |

store | 0 | 1 | 7 | 7 | 0 | 3 | 0 |

food | 0 | 1 | 4 | 7 | 0 | 2 | 0 |

**Variable type: Date**

skim_variable | n_missing | complete_rate | min | max | median | n_unique |
---|---|---|---|---|---|---|

date | 0 | 1 | 2024-01-12 | 2024-02-10 | 2024-01-26 | 30 |

**Variable type: numeric**

skim_variable | n_missing | complete_rate | mean | sd | p0 | p25 | p50 | p75 | p100 | hist |
---|---|---|---|---|---|---|---|---|---|---|

day | 0 | 1 | 15.5 | 8.80 | 1.00 | 8.25 | 15.50 | 22.75 | 30.00 | ▇▇▇▇▇ |

weight | 0 | 1 | 810.8 | 123.37 | 510.29 | 715.82 | 793.79 | 907.18 | 1048.93 | ▁▆▇▇▂ |

The variable we will use in this analysis is `weight`

which records the total weight of the order (in grams).

# Typical weight of a Chipotle order

## Observed sample

**Demo:** Visualize the distribution of `weight`

using a histogram and calculate the arithmetic mean.

```
ggplot(data = chipotle, mapping = aes(x = weight)) +
geom_histogram()
```

``stat_bin()` using `bins = 30`. Pick better value with `binwidth`.`

```
|>
chipotle summarize(mean = mean(weight))
```

```
# A tibble: 1 × 1
mean
<dbl>
1 811.
```

**Your turn:**

- What is the sample statistic?
- How large will each bootstrap sample be?
- How many bootstrap resamples do we need?

## Generate bootstrap means

**Demo:** Generate 1,000 bootstrap means of the order weight.

```
set.seed(123) # to ensure reproducibility
# observed difference
<- chipotle |>
d_hat specify(response = weight) |>
calculate(stat = "mean")
<- chipotle |>
boot_df specify(response = weight) |>
generate(reps = 1000, type = "bootstrap") |>
calculate(stat = "mean")
```

**Your turn:** Take a `glimpse()`

of `boot_df`

. What do you see?

`glimpse(boot_df)`

```
Rows: 1,000
Columns: 2
$ replicate <int> 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 1…
$ stat <dbl> 786.2261, 790.0061, 803.2358, 750.3168, 773.9413, 805.1258, …
```

**Your turn:** Plot a histogram of `boot_df`

. Where is it centered? Why does this make sense?

`visualize(data = boot_df)`

## Create a 95% confidence interval

**Demo:** Now let’s use `boot_df`

to create our 95% confidence interval.

`get_ci(x = boot_df, level = 0.95)`

```
# A tibble: 1 × 2
lower_ci upper_ci
<dbl> <dbl>
1 766. 853.
```

**Demo:** Let’s visualize our confidence interval by adding a vertical line at each of these values.

```
visualize(data = boot_df) +
shade_ci(endpoints = get_ci(x = boot_df, level = 0.95))
```

## Interpreting confidence intervals

How do we interpret this confidence interval?

- There is a 95% probability the true weight of Chipotle orders is between 766 and 854 grams.
- There is a 95% probability the weight of Chipotle orders is between 766 and 854 grams.
- We are 95% confident the true weight of Chipotle orders is between 766 and 854 grams.
- We are 95% confident the weight of Chipotle orders is between 766 and 854 grams.

*Add response here.*

## Alternative confidence intervals

**Your turn:** Create a 90% confidence interval. Report it below and visualize it with the histogram created above. Is it wider or more narrow than the 95% confidence interval?

`# add code here`

*Add response here.*

# Difference in weight of Chipotle orders

We can calculate bootstrap confidence intervals for a range of statistical parameters.

**Your turn:** Estimate a 95% confidence interval for the difference in means between orders placed by a person and those placed online.

```
# observed difference
<- chipotle |>
d_hat specify(TODO) |>
calculate(stat = TODO, order = c("Person", "Online"))
# bootstrap CI
<- chipotle |>
boot_diff_df
TODO
visualize(boot_diff_df) +
shade_confidence_interval(endpoints = get_ci(x = boot_diff_df, level = 0.95))
get_ci(x = boot_diff_df, level = 0.95)
```

`Error: The pipe operator requires a function call as RHS (<text>:8:3)`

How does that compare to the \(p\)-value from our hypothesis test?

```
<- chipotle |>
null_dist # specify the response and explanatory variable
specify(weight ~ order) |>
# declare the null hypothesis
hypothesize(null = "independence") |>
# simulate the null distribution
generate(reps = 1000, type = "permute") |>
# calculate the difference in means for each permutation
calculate(stat = "diff in means", order = c("Person", "Online"))
# visualize simulated p-value
visualize(null_dist) +
shade_p_value(obs_stat = d_hat, direction = "two-sided")
```

```
# calculate simulated p-value
|>
null_dist get_p_value(obs_stat = d_hat, direction = "two-sided")
```

```
Warning: Please be cautious in reporting a p-value of 0. This result is an approximation
based on the number of `reps` chosen in the `generate()` step.
ℹ See `get_p_value()` (`?infer::get_p_value()`) for more information.
```

```
# A tibble: 1 × 1
p_value
<dbl>
1 0
```

*Add response here.*

# Multiple explanatory variables

We often calculate confidence intervals for the coefficients of multiple explanatory variables in a regression model. These can be useful in communicating our best guess as to the true value of the coefficient, and are often communicated as part of the results of a regression analysis.

**Demo:** Estimate the 95% confidence interval for the coefficients in the multiple variable model, and communicate them in a table and a coefficient plot.

```
# observed results
<- chipotle |>
obs_fit specify(weight ~ order + meat + food + store) |>
fit()
# null distribution for p-values
<- chipotle |>
null_full_dist specify(weight ~ order + meat + food + store) |>
hypothesize(null = "independence") |>
generate(reps = 1000, type = "permute") |>
fit()
<- get_p_value(null_full_dist, obs_stat = obs_fit, direction = "two-sided") p_vals
```

```
Warning: Please be cautious in reporting a p-value of 0. This result is an approximation
based on the number of `reps` chosen in the `generate()` step.
ℹ See `get_p_value()` (`?infer::get_p_value()`) for more information.
```

```
# bootstrap distribution for CIs
<- chipotle |>
boot_full_dist specify(weight ~ order + meat + food + store) |>
generate(reps = 1000, type = "bootstrap") |>
fit()
# get 95% confidence interval
<- get_ci(boot_full_dist, level = 0.95, point_estimate = obs_fit) conf_ints
```

```
# visualize regression results using a results table
|>
obs_fit # join with p-values
left_join(p_vals) |>
# join with confidence intervals
left_join(conf_ints) |>
# print an HTML table
gt() |>
# format for 2 significant digits
fmt_number(
columns = c(estimate, p_value, lower_ci, upper_ci),
decimals = 2
)
```

```
Joining with `by = join_by(term)`
Joining with `by = join_by(term)`
```

term | estimate | p_value | lower_ci | upper_ci |
---|---|---|---|---|

intercept | 843.22 | 0.53 | 767.75 | 924.94 |

orderPerson | 160.62 | 0.00 | 94.08 | 225.00 |

meatChicken | −29.47 | 0.56 | −104.20 | 43.85 |

foodburrito | −82.38 | 0.06 | −148.08 | −24.29 |

storeStore 2 | −62.26 | 0.28 | −139.12 | 20.61 |

storeStore 3 | −93.44 | 0.09 | −168.26 | −20.55 |

```
# visualize regression results using a coefficient plot
|>
obs_fit # join with confidence intervals
left_join(conf_ints) |>
# order the coefficients by size, pull intercept to the beginning (by convention)
mutate(term = fct_reorder(.f = term, .x = estimate) |>
fct_relevel("intercept")) |>
# draw a pointrange plot
ggplot(mapping = aes(x = estimate, y = term, xmin = lower_ci, xmax = upper_ci)) +
geom_pointrange() +
# draw a vertical line at 0
geom_vline(xintercept = 0, linetype = "dashed") +
theme_minimal()
```

`Joining with `by = join_by(term)``