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14 Feb 2023, 02:30
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
55%
(hard)
Question Stats:
69% (02:36) correct
31%
(02:59)
wrong
based on 172
sessions
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In a phase III clinical trial of Dosaxin, a new drug, patients received a progressively growing dosage of Dosaxin for a few days. On the first day, each patient received 15 milligrams of Dosaxin. On each of the following days, the daily dosage was m milligrams greater than the dosage received the day before, reaching a dosage of 43 milligram on the last day of the trial. For how many days did the trial last, if each patient received a total amount of 145 milligrams of Dosaxin during the whole trial ?
A. 4
B. 5
C. 6
D. 7
E. 9
700-Level question!!!
A. 4
B. 5
C. 6
D. 7
E. 9
700-Level question!!!
Updated on: 01 Mar 2023, 04:50
Originally posted by $!vakumar.m on 14 Feb 2023, 03:11.
Last edited by $!vakumar.m on 01 Mar 2023, 04:50, edited 2 times in total.
Last edited by $!vakumar.m on 01 Mar 2023, 04:50, edited 2 times in total.
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First day of trial = 15 mg dosage
2nd day = 15 + m mg dosage
and so on till the last day(say n+1 days) = 15 + nm = 43 mg (given)
on solving above, mn = 28
Now the total dosage received by each patient by the end of whole trial is 145 mg
15 + 15 + m + 15 + 2m ..... + 15 + nm = 145
15(n+1) + m (1+2+3..+n) = 145
15(n+1) + mn(n+1)/2 =145
substituting mn = 28 and solving we get
m = 7 and n = 4
therefore the trial lasted 5 days
Answer B
2nd day = 15 + m mg dosage
and so on till the last day(say n+1 days) = 15 + nm = 43 mg (given)
on solving above, mn = 28
Now the total dosage received by each patient by the end of whole trial is 145 mg
15 + 15 + m + 15 + 2m ..... + 15 + nm = 145
15(n+1) + m (1+2+3..+n) = 145
15(n+1) + mn(n+1)/2 =145
substituting mn = 28 and solving we get
m = 7 and n = 4
therefore the trial lasted 5 days
Answer B
14 Feb 2023, 14:25
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Bunuel
No need to go very far to solve this.
Each day following the first the dosage increases by m until the last day the dose is 43.
So the dosage on the last day is:
15 + (n-1)m = 43
So, m(n-1) = 28. We know n must be an integer so m must also be an integer.
So, the pairs of numbers satisfying the above, m and n, respectively could be:
1 29
2 15
4 8
7 5
14 3
28 2
Only 5 above appears among the answer choices
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