BREAKING: Target Test Prep releases Brand New 2026 On Demand GMAT prep course

Redeem

Thurston wrote an important seven-digit phone number on a napkin, but the last three numbers got smudged. Thurston

This topic has expert replies
Post new topic Post Reply
Previous Topic Next Topic
Moderator
Posts: 7187
Joined: Thu Sep 07, 2017 4:43 pm
Followed by:23 members

Thurston wrote an important seven-digit phone number on a napkin, but the last three numbers got smudged. Thurston

by BTGmoderatorDC » Wed May 20, 2020 5:58 pm

Timer

00:00

Your Answer

A

B

C

D

E

Global Stats

Thurston wrote an important seven-digit phone number on a napkin, but the last three numbers got smudged. Thurston remembers only that the last three digits contained at least one zero and at least one non-zero integer. If Thurston dials 10 phone numbers by using the readable digits followed by 10 different random combinations of three digits, each with at least one zero and at least one non-zero integer, what is the probability that he will dial the original number correctly?

A. 1/9
B. 10/243
C. 1/27
D. 10/271
E. 1/1000000


OA C

Source: Veritas Prep
Top
Source: — Problem Solving |
Junior | Next Rank: 30 Posts
Posts: 11
Joined: Wed May 20, 2020 9:34 pm

Re: Thurston wrote an important seven-digit phone number on a napkin, but the last three numbers got smudged. Thurston

by anonylfc » Fri May 22, 2020 8:10 am
Basically, probably of success= successful attempts/ total attempts
We are already given successful attempts, which are 10.

Now, of the 3 unreadable digits, atleast one is 0 and atleast one is non-zero.
Hence you can create the following 2 cases =
1. 0 _ _ = In the dashes there are 9 possible cases each (1,2,....,9)
Hence 9*9 = 81 cases.
But, there are 2 other variations of this arrangement _ 0 _ and _ _ 0 also. Hence total number of cases
81*3=243

2. 0 0 _ = The dashes means 9 possible cases. However, again there are 2 other variations for this arrangement 0 _ 0 or _ 0 0. Hence 9*3 = 27 cases

In all, there are 270 cases.
=> Probability = 10/27 = 1/27 (C)
Top

GMAT/MBA Expert

User avatar
GMAT Instructor
Posts: 8083
Joined: Sat Apr 25, 2015 10:56 am
Location: Los Angeles, CA
Thanked: 43 times
Followed by:29 members

Re: Thurston wrote an important seven-digit phone number on a napkin, but the last three numbers got smudged. Thurston

by Scott@TargetTestPrep » Sun May 24, 2020 7:20 am
BTGmoderatorDC wrote:
Wed May 20, 2020 5:58 pm
 Thurston wrote an important seven-digit phone number on a napkin, but the last three numbers got smudged. Thurston remembers only that the last three digits contained at least one zero and at least one non-zero integer. If Thurston dials 10 phone numbers by using the readable digits followed by 10 different random combinations of three digits, each with at least one zero and at least one non-zero integer, what is the probability that he will dial the original number correctly?

A. 1/9
B. 10/243
C. 1/27
D. 10/271
E. 1/1000000


OA C

Solution:

We can divide the last 3 digits of the phone number into 2 cases:

1) exactly 1 zero and 2 non-zero digits.

2) exactly 2 zeros and 1 non-zero digit.

Case 1: ZNN, NZN, NNZ (where Z is the 0 digit and N is a nonzero digit)

(1 x 9 x 9) x 3 = 243

Case 2: ZZN, ZNZ, NZZ

(1 x 1 x 9) x 3 = 27

Therefore, the total number of ways the last 3 digits of the phone number can be formed given that there is at least one zero and at least one non-zero digit is 243 + 27 = 270. Since Thurston tries 10 of them, the probability he dials the correct phone number is 10/27 = 1/27.

Answer: C

Scott Woodbury-Stewart
Founder and CEO
[email protected]

Image

See why Target Test Prep is rated 5 out of 5 stars on BEAT the GMAT. Read our reviews

ImageImage
Top
Post new topic Post Reply
• Page 1 of 1