Accuplacer Practice Test

Disable ads (and more) with a membership for a one time $2.99 payment

Prepare for the Accuplacer Test with our comprehensive quiz featuring multiple choice questions, flashcards, hints, and explanations designed to enhance learning. Ace your exam and secure your academic future!

Practice this question and more.

From 5 employees at a company, a group of 3 employees will be chosen to work on a project. How many different groups of 3 employees can be chosen?

The correct answer is: 15

To determine how many different groups of 3 employees can be formed from a total of 5 employees, you can use the concept of combinations. The formula for combinations is given by: \[ C(n, r) = \frac{n!}{r!(n - r)!} \] where $ n $ is the total number of items to choose from (in this case, employees), $ r $ is the number of items to choose (here, the group size), and $ ! $ denotes factorial, which is the product of all positive integers up to that number. In this scenario, you have 5 employees and you want to choose 3: 1. Identify $ n $ and $ r $: - $ n = 5 $ (the employees) - $ r = 3 $ (the number of employees in each group) 2. Substitute into the formula: \[ C(5, 3) = \frac{5!}{3!(5 - 3)!} = \frac{5!}{3! \times 2!} \] 3. Calculate the factorials: - \( 5! = 5 \times 4