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03 Feb 2022, 02:30
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
45%
(medium)
Question Stats:
73% (02:33) correct
27%
(02:31)
wrong
based on 468
sessions
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There were 5 candidates (Alexa, Bill, Charlie, Dan, and Ernie) vying for student council, and 100 total votes were cast. Everyone received at least one vote, and no two candidates received the same number of votes. Alexa won the election with 40 votes, Bill came in 2nd, Charlie in 3rd, Dan in 4th, and Ernie in last. What is the greatest number of votes that Dan could have received?
A. 20
B. 19
C. 18
D. 17
E. 16
A. 20
B. 19
C. 18
D. 17
E. 16
03 Feb 2022, 03:06
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We have
40>B>C>D>E>=1 and B+C+D+E=60
To maximize D, B and C should be as close to D as possible. E should be 1.
How about B=D+2, C=D+1, and E=1
(D+2)+(D+1)+(D) + (1)=60 => 3D = 56 => D = 18.666666666...
18.66666... is the maximum D, but D must be an integer.
D has to be 18
40,21,20,18,1
OR
40,20,19,18,3
The answer is (C).
40>B>C>D>E>=1 and B+C+D+E=60
To maximize D, B and C should be as close to D as possible. E should be 1.
How about B=D+2, C=D+1, and E=1
(D+2)+(D+1)+(D) + (1)=60 => 3D = 56 => D = 18.666666666...
18.66666... is the maximum D, but D must be an integer.
D has to be 18
40,21,20,18,1
OR
40,20,19,18,3
The answer is (C).
General Discussion
03 Feb 2022, 04:40
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Given: There were 5 candidates (Alexa, Bill, Charlie, Dan, and Ernie) vying for student council, and 100 total votes were cast. Everyone received at least one vote, and no two candidates received the same number of votes. Alexa won the election with 40 votes, Bill came in 2nd, Charlie in 3rd, Dan in 4th, and Ernie in last.
Asked: What is the greatest number of votes that Dan could have received?
To maximize Dan's votes, we have to maximize votes received by Bill, Charlie and Dan and reduce their differences to minimum 1 and to minimise votes received by Ernie to 1 vote.
Votes received by Alexa = 40
Let votes received by Dan be x.
Votes received by Bill = x+2
Votes received by Charlie = x+1
Votes recieved by Dan = x
Votes received by Ernie = d
Total votes = 40 + (x+2) + (x+1) + x + d = 100
43 + 3x + d = 100
3x = 57 - d
x = 18; Since d can not be 0 and should be minimum 3.
IMO C
Asked: What is the greatest number of votes that Dan could have received?
To maximize Dan's votes, we have to maximize votes received by Bill, Charlie and Dan and reduce their differences to minimum 1 and to minimise votes received by Ernie to 1 vote.
Votes received by Alexa = 40
Let votes received by Dan be x.
Votes received by Bill = x+2
Votes received by Charlie = x+1
Votes recieved by Dan = x
Votes received by Ernie = d
Total votes = 40 + (x+2) + (x+1) + x + d = 100
43 + 3x + d = 100
3x = 57 - d
x = 18; Since d can not be 0 and should be minimum 3.
IMO C
