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14 Apr 2026, 19:00
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E
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:
70% (02:03) correct
30%
(02:38)
wrong
based on 61
sessions
History
Date
Time
Result
Not Attempted Yet
Before the start of the fall service cycle, the city transit authority revised Route G by increasing service frequency and adding a stop near a busy office district. Based on those changes, the authority expected the average (arithmetic mean) number of riders on Route G each weekday to increase by 20 percent. Did the average (arithmetic mean) number of riders on Route G each weekday actually increase by more than 25 percent?
(1) The actual average (arithmetic mean) number of riders on Route G each weekday was 500 higher than expected.
(2) The actual average (arithmetic mean) number of riders on Route G each weekday was less than 12,600.
(1) The actual average (arithmetic mean) number of riders on Route G each weekday was 500 higher than expected.
(2) The actual average (arithmetic mean) number of riders on Route G each weekday was less than 12,600.
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21 Apr 2026, 04:00
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GMAT Club Official Solution:
Before the start of the fall service cycle, the city transit authority revised Route G by increasing service frequency and adding a stop near a busy office district. Based on those changes, the authority expected the average (arithmetic mean) number of riders on Route G each weekday to increase by 20 percent. Did the average (arithmetic mean) number of riders on Route G each weekday actually increase by more than 25 percent?
Let r be the original average number of riders on Route G each weekday. Then the expected new average was 1.2r.
We need to know whether the actual new average was greater than 1.25r.
(1) The actual average (arithmetic mean) number of riders on Route G each weekday was 500 higher than expected.
So the actual average was 1.2r + 500
We need to know whether 1.2r + 500 > 1.25r:
500 > 0.05r
r < 10,000
Since r is not determined, the answer cannot be determined. Not sufficient.
(2) The actual average (arithmetic mean) number of riders on Route G each weekday was less than 12,600.
This gives only an upper bound on the actual average. By itself, it does not tell us whether the increase was more than 25 percent. Not sufficient.
(1) + (2) From statement (1), the actual average was 1.2r + 500. Using statement (2):
1.2r + 500 < 12,600
1.2r < 12,100
r < 12,100/1.2
Since 12,100/1.2 > 10,000, from r < 12,100/1.2, r may be greater than 10,000 or less than 10,000. Not sufficient.
Answer: E.
Before the start of the fall service cycle, the city transit authority revised Route G by increasing service frequency and adding a stop near a busy office district. Based on those changes, the authority expected the average (arithmetic mean) number of riders on Route G each weekday to increase by 20 percent. Did the average (arithmetic mean) number of riders on Route G each weekday actually increase by more than 25 percent?
Let r be the original average number of riders on Route G each weekday. Then the expected new average was 1.2r.
We need to know whether the actual new average was greater than 1.25r.
(1) The actual average (arithmetic mean) number of riders on Route G each weekday was 500 higher than expected.
So the actual average was 1.2r + 500
We need to know whether 1.2r + 500 > 1.25r:
500 > 0.05r
r < 10,000
Since r is not determined, the answer cannot be determined. Not sufficient.
(2) The actual average (arithmetic mean) number of riders on Route G each weekday was less than 12,600.
This gives only an upper bound on the actual average. By itself, it does not tell us whether the increase was more than 25 percent. Not sufficient.
(1) + (2) From statement (1), the actual average was 1.2r + 500. Using statement (2):
1.2r + 500 < 12,600
1.2r < 12,100
r < 12,100/1.2
Since 12,100/1.2 > 10,000, from r < 12,100/1.2, r may be greater than 10,000 or less than 10,000. Not sufficient.
Answer: E.
General Discussion
BongBideshini
Joined: 25 May 2021
Last visit: 09 May 2026
Posts: 199
Given Kudos: 82
Location: India
Concentration: Entrepreneurship, Marketing
Schools: HBS '27 Stanford '27 Wharton '27 Sloan '27
GPA: 3.8
WE:Engineering (Government)
Products:
14 Apr 2026, 23:18
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Let the original average = x
Expected after increase = 1.2x
Did actual > 1.25x ?
(1)
Actual = expected + 500 = 1.2x + 500
Is 1.2x + 500 > 1.25x ?
→ 500 > 0.05x
→ x < 10000
We don’t know x, so sometimes yes, sometimes no → Not sufficient
(2)
Actual < 12600
We need to compare actual with 1.25x, but we don’t know x → Not sufficient
(1) + (2)
From (1):
Actual = 1.2x + 500
Plug into (2):
1.2x + 500 < 12600
1.2x < 12100
x < 10083.33
Now check condition again:
Need x < 10000
But from combined info:
x < 10083.33
This still allows:
Final Answer: E
Expected after increase = 1.2x
Did actual > 1.25x ?
(1)
Actual = expected + 500 = 1.2x + 500
Is 1.2x + 500 > 1.25x ?
→ 500 > 0.05x
→ x < 10000
We don’t know x, so sometimes yes, sometimes no → Not sufficient
(2)
Actual < 12600
We need to compare actual with 1.25x, but we don’t know x → Not sufficient
(1) + (2)
From (1):
Actual = 1.2x + 500
Plug into (2):
1.2x + 500 < 12600
1.2x < 12100
x < 10083.33
Now check condition again:
Need x < 10000
But from combined info:
x < 10083.33
This still allows:
- x < 10000, YES
- 10000 ≤ x < 10083, NO
Final Answer: E
Bunuel
