Let's call the 4 files A, B, C and D.shankar.ashwin wrote:In a certain company, three typists service for four departments. If the departments each send a file to the typists at random, what is the probability that every typist will receive at least one file?
A. 8/9
B. 64/81
C. 4/9
D. 16/81
E. 5/9
GMATGuruNY wrote:Let's call the 4 files A, B, C and D.shankar.ashwin wrote:In a certain company, three typists service for four departments. If the departments each send a file to the typists at random, what is the probability that every typist will receive at least one file?
A. 8/9
B. 64/81
C. 4/9
D. 16/81
E. 5/9
Number of ways the files can be assigned:
Since each file can be assigned to any one of the 3 typists:
Number of options for A = 3.
Number of options for B = 3.
Number of options for C = 3.
Number of options for D = 3.
To combine the options above, we multiply:
Total possible assignments = 3*3*3*3 = 81.
Now we need to determine how many ways the files can be assigned so that every typist is assigned at least 1 file.
For every typist to be assigned at least 1 file, one typist must be assigned a pair of files, while the other 2 typists are each assigned 1 file.
Case 1:
One typist is assigned AB, one typist is assigned C, and one typist is assigned D.
Number of ways to arrange the 3 elements AB, C and D = 3! = 6.
Remaining cases:
In the arrangements above, AB can be replaced with any pair of files.
Thus, the result above needs to be multiplied by the number of pairs that can replace AB.
Number of pairs that can be made from the 4 files = 4C2 = 6.
Multiplying the two results, we get:
Number of ways to assign the files so that every typist is assigned at least 1 file = 6*6 = 36.
P(every typist gets at least 1 file) = 36/81 = 4/9.
The correct answer is C.
Since there are 4 files, and each file could be assigned to any of the 3 typists, the number of ways to assign the files = 3*3*3*3 = 81.knight247 wrote:P.S. Mitch, is there any way you could show how to solve this problem using the complementary i.e.
P(Each one gets assigned atleast one file)=1-P(One person does not get any file). Thanks!!
Hey Mitch,GMATGuruNY wrote: One of the 3 typists is assigned all 4 files:
Number of typists who could receive all 4 files = 3.
EXACTLY ONE is not the opposite of ALL.knight247 wrote:Hey Mitch,GMATGuruNY wrote: One of the 3 typists is assigned all 4 files:
Number of typists who could receive all 4 files = 3.
I'm not quite sure of this part. Coz we know that
P(All of them recv atleast 1 file)+P(EXACTLY 1 of them does not get a file)=1
If this is the case then can we consider 1 typist receiving all 4 files? Wouldn't that be the number of ways that two typists receive no files which we are not supposed to include? Hope u can comment.
Mitch,GMATGuruNY wrote:Let's call the 4 files A, B, C and D.shankar.ashwin wrote:In a certain company, three typists service for four departments. If the departments each send a file to the typists at random, what is the probability that every typist will receive at least one file?
A. 8/9
B. 64/81
C. 4/9
D. 16/81
E. 5/9
Number of ways the files can be assigned:
Since each file can be assigned to any one of the 3 typists:
Number of options for A = 3.
Number of options for B = 3.
Number of options for C = 3.
Number of options for D = 3.
To combine the options above, we multiply:
Total possible assignments = 3*3*3*3 = 81.
Now we need to determine how many ways the files can be assigned so that every typist is assigned at least 1 file.
For every typist to be assigned at least 1 file, one typist must be assigned a pair of files, while the other 2 typists are each assigned 1 file.
Case 1:
One typist is assigned AB, one typist is assigned C, and one typist is assigned D.
Number of ways to arrange the 3 elements AB, C and D = 3! = 6.
Remaining cases:
In the arrangements above, AB can be replaced with any pair of files.
Thus, the result above needs to be multiplied by the number of pairs that can replace AB.
Number of pairs that can be made from the 4 files = 4C2 = 6.
Multiplying the two results, we get:
Number of ways to assign the files so that every typist is assigned at least 1 file = 6*6 = 36.
P(every typist gets at least 1 file) = 36/81 = 4/9.
The correct answer is C.
In assigning d1, d2 and d3 each to a DIFFERENT typist and then assigning d4 LAST, the solution above overly restricts the number of ways the files can be PAIRED.gmat6087 wrote:Mitch,shankar.ashwin wrote:In a certain company, three typists service for four departments. If the departments each send a file to the typists at random, what is the probability that every typist will receive at least one file?
A. 8/9
B. 64/81
C. 4/9
D. 16/81
E. 5/9
Kindly correct me where I am wrong.
81 is the total ways.
Now 4 dept(d1,d2,d3,d4) 3 typists(t1,t2,t3)
d1 has 3 options 3(3 typists).
after d1 , d2 has 2 options 2(2 typists left).
After d1 and d2, d3 has 1 option 1(1 typist left)
After d1,d2 and d3, d4 has 3 options 3(can give the letter to any one of the 3 typist)
multiplying we get 3*2*1*3=18
Please help me here
Regards,
Satya
