About probability without replacement.

  • Thread starter Thread starter kenny1999
  • Start date Start date
  • Tags Tags
    Probability
Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
4 replies · 3K views
kenny1999
Messages
235
Reaction score
5

Homework Statement



2 cards are drawn from a deck of 52 playing cards at random without replacement.
(a) Find the probability that both cards drawn are of the same suit.
(b) Find the probability that both cards drawn are face cards given that they are of the same suit.

Homework Equations


The Attempt at a Solution



I have no problem with the part (a) but part (b) makes me confused.
Do I have to use conditional probability to work out the solution of part (b)?
If that's the case, how to determine the event involved? In other words, how to do?

Thank you.
 
Last edited:
Physics news on Phys.org
kenny1999 said:

Homework Statement



2 cards are drawn from a deck of 52 playing cards at random without replacement.
(a) Find the probability that both cards drawn are of the same unit.
(b) Find the probability that both cards drawn are face cards given that they are of the same unit.

Homework Equations


The Attempt at a Solution



I have no problem with the part (a) but part (b) makes me confused.
Do I have to use conditional probability to work out the solution of part (b)?
If that's the case, how to determine the event involved? In other words, how to do?

Thank you.

Prove that you have no problem with (a) by showing your solution. That will also be the basis for solving (b). As you surmise, (b) does involve conditional probability, and you solve it by using the definitions and formulas for conditional probability that are in your textbook or course notes. Of course, before you can calculate anything you need to understand what is being asked, so you need to translate the words into a mental picture. Just imaging drawing out two cards over and over again, many times, and taking note of the results. Now try to put question (b) into the context of your experiment.

Note added in editing: I assume by the word "unit" you mean the same face-value, so two Queens would be OK, but not a King and a Queen. I have never before heard of the word "unit" in connection with cards.

RGV
 
Last edited:
In order that the two cards be face cards, the first card must be one of Jack, Queen, King. What is the probability of that? How many face cards are there in the 52 card deck. Now the second card must be the same as the first. What is the probability of that? How many of that same rank are left in the remaining 51 cards?
 
Last edited by a moderator:
Ray Vickson said:
Prove that you have no problem with (a) by showing your solution. That will also be the basis for solving (b). As you surmise, (b) does involve conditional probability, and you solve it by using the definitions and formulas for conditional probability that are in your textbook or course notes. Of course, before you can calculate anything you need to understand what is being asked, so you need to translate the words into a mental picture. Just imaging drawing out two cards over and over again, many times, and taking note of the results. Now try to put question (b) into the context of your experiment.

Note added in editing: I assume by the word "unit" you mean the same face-value, so two Queens would be OK, but not a King and a Queen. I have never before heard of the word "unit" in connection with cards.

RGV

sorry , wrongly typed, not same "unit", but same "suit"
 
For the first problem, then, the first card drawn can be anything. There are then 51 cards left in the pack, 12 of them of the same suit as the first.

For the second problem, the probability that the first card is a face card is 12/52= 3/13. There are then 3 face cards left of the 11 cards left in that same suit.