To find the probability of a client choosing model B with a garage, we need to first count the total number of options available. There are 6 house models to choose from (model A, B, C, D, E, and F) and for each model, a client can choose to have either a garage or a carport.
So for each house model, there are 2 options (garage or carport). That means there are a total of 6 models x 2 options = 12 possible choices.
To find the probability of a client choosing model B with a garage, we need to determine how many options satisfy our condition. In this case, only 1 option fits the criteria: model B with a garage.
So the probability of a client choosing model B with a garage is 1 out of 12, which can be simplified to 1/12.
3 answers
Therefore, the probability of a client choosing model B with a garage is 1/12.
Which chart correctly displays all the possible choices a client has when selecting a new home from this builder?
The correct chart to display all the possible choices a client has when selecting a new home from this builder should list each house model along with the garage or carport option for each model. Here is an example chart:
House Model | Option
----------------------------
Model A | Garage
Model A | Carport
Model B | Garage
Model B | Carport
Model C | Garage
Model C | Carport
Model D | Garage
Model D | Carport
Model E | Garage
Model E | Carport
Model F | Garage
Model F | Carport
This chart displays all 12 possible choices a client has when selecting a new home from this builder.
House Model | Option
----------------------------
Model A | Garage
Model A | Carport
Model B | Garage
Model B | Carport
Model C | Garage
Model C | Carport
Model D | Garage
Model D | Carport
Model E | Garage
Model E | Carport
Model F | Garage
Model F | Carport
This chart displays all 12 possible choices a client has when selecting a new home from this builder.
1 answer