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Inequalities: Reciprocal Rule

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Inequalities: Reciprocal Rule

by AkiB » Wed Jul 16, 2014 12:04 am
What is the largest integer n such that 1/2^n> 0.01?

a)5
b)6
c)7
d)10
e)51

The solution to this problem mentioned in the OG is as follows
Since 1/2^n > 0.01 is equivalent to 2n < 100, find
2"
the largest integer n such that 2" < 100. Using
trial and error, 2^6 = 64 and 64 < 100, but
2^7 = 128 and 128 > 100. Therefore, 6 is the largest
integer such that 2^n > 0.01.
The correct answer is B.

My question is

The inequality sign only flips if u multiply or divide by a negative number, so why does the sign flip in the above case.

Thanks
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by unknown13 » Wed Jul 16, 2014 12:14 am
Hi
IMO answer is B

as 0.01 = 1/100
and (1/2)^n for n = 7 is 1/128
and for n = 6 it is 1/64

so highest integer value will be 6

thanks and regards
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by [email protected] » Wed Jul 16, 2014 12:15 am
Hi AkiB,

This question asks us to compare fractions. The decimal .01 can be written as 1/100. Since 1/(2^N) and 1/100 both have numerators that equal 1, we can focus on the denominators. We're asked how big we can make N so that 1/(2^N) > 1/100. For the first fraction to be bigger than the second, the denominator must be SMALLER than 100, BUT we still have to make it as BIG as possible.

In answer to your question, the sign doesn't "flip"; you're actually cross-multiplying the inequality, so....

1/(2^N) > 1/100

becomes....

100 > 2^N

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by Matt@VeritasPrep » Wed Jul 16, 2014 10:46 am
Here's a nice algebraic approach.

(1/2)� > .01 is really
(1/2)� > 1/100, or
1/2� > 1/100

Since 2� and 100 are both positive, when we cross-multiply, the sign WON'T flip. So we have

100 > 2�

We know that 2�=128 > 100 > 2�=64, so n must be 6.
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by GMATinsight » Wed Jul 16, 2014 6:36 pm
AkiB wrote:What is the largest integer n such that 1/2^n> 0.01?

a)5
b)6
c)7
d)10
e)51

The solution to this problem mentioned in the OG is as follows
Since 1/2^n > 0.01 is equivalent to 2n < 100, find
2"
the largest integer n such that 2" < 100. Using
trial and error, 2^6 = 64 and 64 < 100, but
2^7 = 128 and 128 > 100. Therefore, 6 is the largest
integer such that 2^n > 0.01.
The correct answer is B.

My question is

The inequality sign only flips if u multiply or divide by a negative number, so why does the sign flip in the above case.

Thanks
For better understanding of the rules of Inequality, Please see the rules below:

Inequality Rules

Image
Image

Transitive Property of Inequalities

If a < b and b < c , then a < c.
If a ≤ b and b ≤ c , then a ≤ c.
If a > b and b > c , then a > c.
If a ≥ b and b ≥ c , then a ≥ c.
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