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27 Sep 2009, 13:27
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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:
35%
(medium)
Question Stats:
72% (01:52) correct
28%
(01:55)
wrong
based on 1341
sessions
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Denise is trying to open a safe whose combination she does not know. If the safe has 4000 possible combinations,and she can try 75 different possibilities,what is the probability that she does not pick the one correct combination.
A. 1
B. 159/160
C. 157/160
D. 3/160
E. 0
A. 1
B. 159/160
C. 157/160
D. 3/160
E. 0
24 Oct 2009, 20:37
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sacmanitin
When trying the first time the probability Denise doesn't pick the correct combination=3999/4000
Second time, as the total number of possible combinations reduced by one, not picking the right one would be 3998/3999.
Third time 3997/3998
...
And the same 75 times.
So we get: \(\frac{3999}{4000}*\frac{3998}{3999}*...*\frac{3925}{3926}\) every denominator but the first will cancel out and every nominator but the last will cancel out as well.
We'll get \(\frac{3925}{4000}=\frac{157}{160}\).
Answer: C.
01 Nov 2009, 08:00
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If Denise does not pick the correct combination in first 75 try, then the correct combination is one of remaining 3925. So Probability = 3925/4000 = 157/160.
answer is C.
answer is C.
