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2^n < 0.1

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Joined: 19 Nov 2004

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If n is an integer, is 2^n/1000 > 1? (1) 100/2^n < 0.1 [#permalink]

19 Dec 2004, 19:27

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24. If n is an integer, is 2^n/1000 > 1?

(1) 100/2^n < 0.1
(2) = 32

I got it that (1) is sufficient but I do not know how to approach data set (2)

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Joined: 14 Dec 2004

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Re: DS # 24: 2^n/ 1000 > 1? [#permalink]

19 Dec 2004, 20:03

If (2) is n= 32
then, dataset 2 also is sufficient.

cpcalanoc wrote:

24. If n is an integer, is 2^n/1000 > 1?

(1) 100/2^n < 0.1
(2) = 32

I got it that (1) is sufficient but I do not know how to approach data set (2)

Intern

Joined: 19 Nov 2004

Posts: 45

Followers: 0

Kudos [?]: 0 [0], given: 0

Correction on dataset 2 [#permalink]

19 Dec 2004, 20:10

Dataset 2 is as follows:

(2) square root of 2^n = 32

Sorry about that!

Manager

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[#permalink]

19 Dec 2004, 20:25

Then, 2^n = 1024 that is > 1000.

So, dataset 2 is also sufficient.

[#permalink] 19 Dec 2004, 20:25

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If n is an integer, is 2^n/1000 > 1? (1) 100/2^n < 0.1

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If n is an integer, is 2^n/1000 > 1? (1) 100/2^n < 0.1

If n is an integer, is 2^n/1000 > 1? (1) 100/2^n < 0.1

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