A large company plans to develop a private subdivision. There are 6 house models to choose from and for each model, a client may opt to have a garage or a carport. Use A, B, C, D, E, and F as labels for the house models.

To calculate the probability that a client will choose model B with a car garage, we need to first determine the total number of possible options.

For each house model (A, B, C, D, E, F), there are two choices for the client: garage or carport. Therefore, there are a total of 6 house models * 2 choices = 12 possible options.

Next, we need to calculate how many of those possible options correspond to the client choosing model B with a car garage.

Given that there are 6 house models to choose from, and for each model, the client may opt for a garage or a carport, the number of possibilities for model B with a car garage is 1 (for model B) * 1 (for car garage) = 1 option.

Therefore, the probability that a client will choose model B with a car garage is:
Number of favorable outcomes / Total number of possible outcomes = 1 / 12 = 0.0833 or 8.33%

So, the probability that a client will choose model B with a car garage is 8.33%.