duahsolo wrote:An army's recruitment process included n rounds of selection tasks. For the first a rounds, the rejection percentage was 60 percent per round. For the next b rounds, the rejection percentage was 50 percent per round and for the remaining rounds, the selection percentage was 70 percent per round. If there were 100,000 people who applied for the army and 1,400 were finally selected, what was the value of n? (Source: e-gmat)
A) 4
B) 5
C) 6
D) 8
E) 10
[spoiler]Correct Answer: C[/spoiler][/spoiler]
Given that the rejection rate in the first 'a' rounds = 60% per round, thus the selection rate per round = 40% = 2/5 per round for the first 'a' rounds
Thus, after the first 'a' rounds, the number of selections = 1,00,000*(2/5)^a ---(1)
Given that the rejection rate in the next 'b' rounds = 50% per round, thus the selection rate per round = 50% = 1/2 per round for the next 'b' rounds
Thus, after '(a + b)' rounds, the number of selections = 1,00,000*(2/5)^a*(1/2)^b ---(2)
It is given that the selection rate per round for the remaining rounds (n - a - b) = 70% per round = 7/10 per round for the next '(n - a - b)' rounds
Thus, after 'n' rounds, the number of selections = 1,00,000*(2/5)^a*(1/2)^b*(7/10)^(n - a - b) ---(3)
Thus, we have,
1,00,000*(2/5)^a*(1/2)^b*(7/10)^(n - a - b) = 1400
1000*2^a / 5^a * 1^b / 2^b * 7^(n - a - b) / 10^(n - a - b) = 14
500*2^(a-b) / 5^a * 1^b * 7^(n - a - b) / [2^(n - a - b)*5^(n - a - b)] = 7
500*2^(a-b) * 5^(-a) * 7^(n - a - b) * 2^(-n + a + b)*5^(-n + a + b) = 7^1
5^3 * 2^(2+a-b-n + a + b) * 5^(-a-n + a + b) * 7^(n - a - b) = 7^1
2^(2+a-n + a ) * 5^(3-n + b) * 7^(n - a - b) = 2^0 * 5^0 * 7^1
Equating the respective exponents of 2, 3, and 5, we get
2+a-n + a = 0 ---(1)
3-n + b = 0 --(2)
n - a - b = 1 ---(3)
From (1), we get, a = (n - 2)/2 and from (2), we get b = n - 3
By plugging in the values of a and b in (3), we get
n - (n-2)/2 - (n-3) = 1
2n - n + 2 - 2n + 6 = 2
-n + 8 = 2
[spoiler]n = 6.[/spoiler]
The correct answer:
C
Hope this helps!
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