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D
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Difficulty:
35%
(medium)
Question Stats:
75% (02:15) correct
25%
(02:25)
wrong
based on 608
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Number N is randomly selected from a set of all primes between 10 and 40, inclusive. Number K is selected from a set of all multiples of 5 between 10 and 40 inclusive. What is the probability that N+K is odd?
(A) 1/2
(B) 2/3
(C) 3/4
(D) 4/7
(E) 5/8
(A) 1/2
(B) 2/3
(C) 3/4
(D) 4/7
(E) 5/8
02 Aug 2014, 01:28
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kennaval
All primes except 2 are odd, thus N must be odd. For N + K = odd + K to be odd, K must be even.
There are 7 multiples of 5 between 10 and 40, inclusive: 10, 15, 20, 25, 30, 35, and 40. Out of them 3 (15, 25, and 35) are odd.
Therefore the probability that N + K is odd is 4/7.
Answer: D.
P.S. Please name topics properly. Check rule 3 here: rules-for-posting-please-read-this-before-posting-133935.html Thank you.
26 May 2015, 04:25
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sandeepmanocha
Hi sandeepmanocha,
The mistake which you have made is a common confusion which students have between OR and AND events.
In case of an OR event we use the addition sign and in case of an AND event we use the multiplication sign. In this question for N + K to be odd you need to select an odd prime number between 10 and 40 inclusive AND an even multiple of 5 between 10 and 40 inclusive. You have rightly found out the number of ways for both the events.
Your process will give the right answer if you consider the events as AND events instead of OR events i.e. use the multiplication sign instead of an addition sign.
So, P(N + K to be odd) = P(N to be odd) AND P(K to be even)
\(= \frac{8}{8} * \frac{4}{7} = \frac{4}{7}\) which is our answer.
Hope it's clear
Regards
Harsh
