DiamondsDataModel

Initial Visualization

ggplot(diamonds, aes(cut,price)) + geom_boxplot()

ggplot(diamonds, aes(color,price)) + geom_boxplot()

ggplot(diamonds, aes(clarity,price)) + geom_boxplot()

ggplot(diamonds, aes(carat, price)) +
  geom_hex(bins=50)

Subset Data and replot

diamonds2 <- diamonds %>%
  filter(carat <= 2.5)  %>%
  mutate(lprice = log2(price), lcarat = log2(carat))

ggplot(diamonds2, aes(lcarat, lprice)) +
  geom_hex(bins=50)

Simple model and visualization

mod_diamond <- lm(lprice ~ lcarat, data = diamonds2)

grid <- diamonds2 %>%
  data_grid(carat = seq_range(carat, 20)) %>%
  mutate(lcarat = log2(carat)) %>%
  add_predictions(mod_diamond, "lprice") %>%
  mutate(price = 2 ^ lprice)

ggplot(diamonds2, aes(carat, price)) +
  geom_hex(bins = 50) +
  geom_line(data = grid, color = "green", size = 1)

Add residuals and plot

diamonds2 <- diamonds2 %>%
  add_residuals(mod_diamond, "lresid")

ggplot(diamonds2, aes(lcarat, lresid)) +
  geom_hex(bins = 50)

ggplot(diamonds2, aes(cut,lresid)) + geom_boxplot()

ggplot(diamonds2, aes(color,lresid)) + geom_boxplot()

ggplot(diamonds2, aes(clarity,lresid)) + geom_boxplot()

Four parameter model and visualization

mod_diamond2 <- lm(
  lprice ~ lcarat + color + cut + clarity, diamonds2
)

grid <- diamonds2 %>%
  data_grid(cut, .model = mod_diamond2) %>%
  add_predictions(mod_diamond2)
grid

## # A tibble: 5 x 5
##   cut       lcarat color clarity  pred
##   <ord>      <dbl> <chr> <chr>   <dbl>
## 1 Fair      -0.515 G     VS2      11.2
## 2 Good      -0.515 G     VS2      11.3
## 3 Very Good -0.515 G     VS2      11.4
## 4 Premium   -0.515 G     VS2      11.4
## 5 Ideal     -0.515 G     VS2      11.4

ggplot(grid, aes(cut, pred)) +
  geom_point()

Plot residuals of four parameter model

diamonds2 <- diamonds2 %>%
  add_residuals(mod_diamond2, "lresid2")

ggplot(diamonds2, aes(lcarat, lresid2)) +
  geom_hex(bins = 50)

diamonds2 %>%
  filter(abs(lresid2) > 1) %>%
  add_predictions(mod_diamond2) %>%
  mutate(pred = round(2^pred)) %>%
  select(price, pred, carat:table, x:z) %>%
  arrange(price)

## # A tibble: 16 x 11
##    price  pred carat cut       color clarity depth table     x     y     z
##    <int> <dbl> <dbl> <ord>     <ord> <ord>   <dbl> <dbl> <dbl> <dbl> <dbl>
##  1  1013   264 0.25  Fair      F     SI2      54.4    64  4.3   4.23  2.32
##  2  1186   284 0.25  Premium   G     SI2      59      60  5.33  5.28  3.12
##  3  1186   284 0.25  Premium   G     SI2      58.8    60  5.33  5.28  3.12
##  4  1262  2644 1.03  Fair      E     I1       78.2    54  5.72  5.59  4.42
##  5  1415   639 0.35  Fair      G     VS2      65.9    54  5.57  5.53  3.66
##  6  1415   639 0.35  Fair      G     VS2      65.9    54  5.57  5.53  3.66
##  7  1715   576 0.32  Fair      F     VS2      59.6    60  4.42  4.34  2.61
##  8  1776   412 0.290 Fair      F     SI1      55.8    60  4.48  4.41  2.48
##  9  2160   314 0.34  Fair      F     I1       55.8    62  4.72  4.6   2.6 
## 10  2366   774 0.3   Very Good D     VVS2     60.6    58  4.33  4.35  2.63
## 11  3360  1373 0.51  Premium   F     SI1      62.7    62  5.09  4.96  3.15
## 12  3807  1540 0.61  Good      F     SI2      62.5    65  5.36  5.29  3.33
## 13  3920  1705 0.51  Fair      F     VVS2     65.4    60  4.98  4.9   3.23
## 14  4368  1705 0.51  Fair      F     VVS2     60.7    66  5.21  5.11  3.13
## 15 10011  4048 1.01  Fair      D     SI2      64.6    58  6.25  6.2   4.02
## 16 10470 23622 2.46  Premium   E     SI2      59.7    59  8.82  8.76  5.25

Question #1

In the plot of lcarat vs. lprice, there are some bright vertical strips. What do they represent?

Bright vertical strips mean higher diamonds cut ( A high density of population) per weight factors.

Question #2

If log(price) = a_0 + a_1 * log(carat), what does that say about the relationship between price and carat?

It shows positive relationship between price and carat. A rise in carat is associated with a rise in price.

Question #3

Extract the diamonds that have very high and very low residuals. Is there anything unusual about these diamonds? Are they particularly bad or good, or do you think these are pricing errors?

It is pricing error, diamonds with higher clarity are priced lower ( which is not correct). We can conclude that more factors play roles for pricing

diamonds2 <- diamonds %>% 
  filter(carat <= 2.5) %>% 
  mutate(lprice = log2(price), lcarat = log2(carat))

mod_diamond <- lm(lprice ~ lcarat + color + clarity + cut, data = diamonds2)

diamonds2 <- diamonds2 %>%
  add_residuals(mod_diamond,'lresid')

summary(diamonds2$lresid)

##     Min.  1st Qu.   Median     Mean  3rd Qu.     Max. 
## -1.17388 -0.12437 -0.00094  0.00000  0.11920  2.78322

diamonds3 <- diamonds2 %>% filter(lresid > quantile(lresid)[[3]] | lresid < quantile(lresid)[[1]] )

table(diamonds3$clarity)

## 
##   I1  SI2  SI1  VS2  VS1 VVS2 VVS1   IF 
##  391 5032 6898 5879 3810 2395 1686  816

table(diamonds3$cut)

## 
##      Fair      Good Very Good   Premium     Ideal 
##       780      2562      6020      7048     10497

diamonds3 %>% 
  ggplot(aes(clarity,price))+
  geom_boxplot()+
  facet_grid(~cut)

ggplot(diamonds3, aes(cut, price)) + geom_boxplot()

ggplot(diamonds3, aes(color, price)) + geom_boxplot()

ggplot(diamonds3, aes(clarity, price)) + geom_boxplot()

# Use this chunk to place your code for extracting the high and low residuals

Question #4

Does the final model, mod_diamonds2, do a good job of predicting diamond prices? Would you trust it to tell you how much to spend if you were buying a diamond and why?

From the model we can conclude there is a positive relation between real and forecasted diamond price.

mod_diamond2 <- lm(
  lprice ~ lcarat + color + cut + clarity, diamonds2
)

diamonds_p <- diamonds2 %>%
  add_predictions(mod_diamond2)


ggplot(diamonds_p, aes(lprice, pred)) +
  geom_point() +
  geom_abline(slope=1, color="blue")

# Use this chunk to place your code for assessing how well the model predicts diamond prices