a hockey team has red sweater, white swearter, and blue sweater. the team uses red or blue pants and red or white socks. find the number of possible uniforms

To find the number of possible uniforms, we need to consider all the possible combinations of sweaters, pants, and socks.

First, let's look at the sweaters. Since the team has three options (red, white, and blue), there are three possibilities for the sweater.

Next, let's consider the pants. The team can choose either red or blue pants. This gives us a total of two options for the pants.

Finally, let's look at the socks. The team can choose either red or white socks. This gives us two options for the socks.

To find the total number of possible uniforms, we need to multiply the number of options for each category: sweaters, pants, and socks.

Number of sweater options: 3
Number of pants options: 2
Number of socks options: 2

Total number of possible uniforms = Number of sweater options × Number of pants options × Number of socks options
= 3 × 2 × 2
= 12

Therefore, there are 12 possible uniforms for the hockey team.