# Does linear regression work with a categorical independent variable & continuous dependent variable?

I have a dataset where:

X1 - categorical independent variable

X2 - continuous independent variable

y - continuous dependent variable

And I'm looking to use X1 and X2 to predict y. Is linear regression appropriate for this (does it even make sense to regress over a categorical independent variable?)? If so, how can I use linear regression when X1 is a categorical independent variable (e.g. eye colour)?

Should I create a separate linear regression model for each of the categories in X1? Or try to create a multiple linear regression model?

Taking a look online there are mostly resources concerning continuous independent -> continuous dependent (linear regression), or continuous independent -> categorical dependent (logistic regression).

Would appreciate being pointed to any resources/tools that could help me.

• Do you have any code? – Louise Oct 16 '18 at 9:41
• No other than cleaning the data to start to use. I'm just trying to decide the best approach before I get going. – George Oct 16 '18 at 9:47
• Have a look at psychstat3.missouristate.edu/Documents/MultiBook3/Mlt07.htm You basically have to introduce dummy variables to construct dichotomous varibales which you can use in the regression – datasailor Oct 16 '18 at 9:47
• Off-topic here, as it is on methodology rather than programming; more suited for Cross Validated sister site – desertnaut Oct 16 '18 at 10:04

You can use linear regression, but you first need to first encode X1 as a series of variables.

Here's a simple example, using the 'dummy coding' method:

``````┏━━━━━━━━━━━━┳━━━━━┳━━━━━┓
┃ Eye Colour ┃ x11 ┃ x12 ┃
┣━━━━━━━━━━━━╋━━━━━╋━━━━━┫
┃ Blue       ┃  0  ┃  0  ┃
┣━━━━━━━━━━━━╋━━━━━╋━━━━━┫
┃ Brown      ┃  1  ┃  0  ┃
┣━━━━━━━━━━━━╋━━━━━╋━━━━━┫
┃ Green      ┃  0  ┃  1  ┃
┗━━━━━━━━━━━━┻━━━━━┻━━━━━┛
``````

Here's an article that explains different coding methods:

https://stats.idre.ucla.edu/spss/faq/coding-systems-for-categorical-variables-in-regression-analysis-2/