## Tanya prepared 4 different letters to be sent to 4 different addresses. For each letter, she prepared an envelope with

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### Tanya prepared 4 different letters to be sent to 4 different addresses. For each letter, she prepared an envelope with

by BTGmoderatorDC » Thu Nov 24, 2022 3:11 am

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## Global Stats

Tanya prepared 4 different letters to be sent to 4 different addresses. For each letter, she prepared an envelope with its correct address. If the 4 letters are to be put into the 4 envelopes at random, what is the probability that only 1 letter will be put into the envelope with its correct address?

A. 1/24
B. 1/8
C. 1/4
D. 1/3
E. 3/8

OA D

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### Re: Tanya prepared 4 different letters to be sent to 4 different addresses. For each letter, she prepared an envelope wi

by [email protected] » Sun Nov 27, 2022 7:02 am
BTGmoderatorDC wrote:
Thu Nov 24, 2022 3:11 am
Tanya prepared 4 different letters to be sent to 4 different addresses. For each letter, she prepared an envelope with its correct address. If the 4 letters are to be put into the 4 envelopes at random, what is the probability that only 1 letter will be put into the envelope with its correct address?

A. 1/24
B. 1/8
C. 1/4
D. 1/3
E. 3/8

OA D

Source: GMAT Prep
Let's solve this question using counting methods.

So, P(exactly one letter with correct address) = (number of outcomes in which one letter has correct address)/(total number of outcomes)

Let a, b, c and d represent the letters, and let A, B, C and D represent the corresponding addresses.
So, let's list the letters in terms of the order in which they are delivered to addresses A, B, C, and D.
So, for example, the outcome abcd would represent all letters going to their intended addresses.
Likewise, cabd represent letter d going to its intended address, but the other letters not going to their intended addresses.

-------------------
total number of outcomes
The TOTAL number of outcomes = the number of different ways we can arrange a, b, c, and d

RULE: We can arrange n different objects in n! ways.
So, we can arrange the four letters in 4! ways = 24 ways
-------------------

number of outcomes in which one letter has correct address
Now let's list all possible outcomes in which exactly ONE letter goes to its intended addresses:
- acbd
- cbda
- dbac
Aside: At this point you might recognize that there are two outcomes for each arrangement in which one letter goes to its intended address
- dacb
- bdca
- cabd
There are 8 such outcomes.
-------------------

So, P(exactly one letter with correct address) = 8/24 = 1/3

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Brent
Brent Hanneson - Creator of GMATPrepNow.com

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### Re: Tanya prepared 4 different letters to be sent to 4 different addresses. For each letter, she prepared an envelope wi

by [email protected] » Thu Dec 01, 2022 11:08 am
BTGmoderatorDC wrote:
Thu Nov 24, 2022 3:11 am
Tanya prepared 4 different letters to be sent to 4 different addresses. For each letter, she prepared an envelope with its correct address. If the 4 letters are to be put into the 4 envelopes at random, what is the probability that only 1 letter will be put into the envelope with its correct address?

A. 1/24
B. 1/8
C. 1/4
D. 1/3
E. 3/8

OA D

Source: GMAT Prep
Let ABCD be the correct order of the 4 letters in the 4 envelopes. For example, the arrangement ABDC means exactly 2 letters are put correctly in the envelopes and the arrangement ACDB means exactly 1 letter is put correctly in the envelopes. We know that there are 4! = 24 such arrangements. Now let’s list all the arrangements such that letter A is put correctly into its envelope (the alphabets in bold are the letters that are put correctly into their envelopes):

Notice that in the 6 arrangements above, only 2 (the underlined ones) have only letter A (i.e., exactly 1 letter) put correctly in its envelope. Using the same arguments, we can say that if we list all the arrangements such that letter B is put correctly into its envelope, only 2 (out of 6) will have only letter B put correctly in its envelope. We can say the same thing for letters C and D.
Therefore, the number of arrangements where exactly 1 letter is put correctly in its envelope is 2 x 4 = 8. Since there are a total of 24 arrangements, the probability that exactly 1 letter is put correctly in its envelope is 8/24 = 1/3.