These math problems focus on probability and combinatorics, primarily dealing with determining the number of ways to select a specific number of cards (e.g., two 7s, two Kings) from a set, with answers expressed in factorial terms. This is part of introducing binomial notation, which is a fundamental aspect of probability and statistics. Each problem requires calculations using factorial equations to figure out the count of favorable outcomes when choosing a certain number of specific cards from a deck.
Work on practice problems directly here, or download the printable pdf worksheet to practice offline.
Practice:
Choose N Cards from M, Count of Favorable Outcomes - To Factorial Equation
Complete these online problems with 80% or 4 correct answers in a row. Results are immediate.
How many ways can three 9s be drawn from this set? Show as a factorial.
Probability Counting - Choose N Cards from M, Count of Favorable Outcomes - To Factorial Equation Worksheet
| Math worksheet on 'Probability Counting - Choose N Cards from M, Count of Favorable Outcomes - To Factorial Equation (Level 1)'. Part of a broader unit on 'Probability and Statistics - Permutations and Combinations Calculating - Practice' Learn online: app.mobius.academy/math/units/probability_and_statistics_permutations_and_combinations_calculation_practice/ |
| How many ways can two Aces be drawn from this set? Show as a factorial. |
| How many ways can two Aces be drawn from this set? Show as a factorial. |
| How many ways can two 2s be drawn from this set? Show as a factorial. |
| How many ways can two Jacks be drawn from this set? Show as a factorial. |
| How many ways can two 8s be drawn from this set? Show as a factorial. |
| How many ways can two Kings be drawn from this set? Show as a factorial. |
| How many ways can two Kings be drawn from this set? Show as a factorial. |