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If a, b, c and d are positive integers and a/b < c/d, which of the following must be true?

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If a, b, c and d are positive integers and a/b < c/d, which of the following must be true?

by BTGmoderatorDC » Thu Mar 26, 2020 5:01 pm

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If a, b, c and d are positive integers and a/b < c/d, which of the following must be true?

I. (a+c)/(b+d) < c/d
II. (a+c)/(b+d) < a/b
III. (a+c)/(b+d) = a/b + c/d

A. None
B. I only
C. II only
D. I and II
E. I and III


OA B

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Re: If a, b, c and d are positive integers and a/b < c/d, which of the following must be true?

by Scott@TargetTestPrep » Sat Mar 28, 2020 3:07 pm
BTGmoderatorDC wrote:
Thu Mar 26, 2020 5:01 pm
 If a, b, c and d are positive integers and a/b < c/d, which of the following must be true?

I. (a+c)/(b+d) < c/d
II. (a+c)/(b+d) < a/b
III. (a+c)/(b+d) = a/b + c/d

A. None
B. I only
C. II only
D. I and II
E. I and III


OA B

Source: GMAT Prep
Let’s analyze inequalities in the given Roman numerals. That is, if we can simplify them to the inequality in the given problem, then they are true. Otherwise, they are not.

I. (a + c)/(b + d) < c/d

d(a + c) < c(b + d)

ad + cd < bc + cd

ad < bc

Dividing both sides by bd, we have:

a/b < c/d

We see that I is true.

II. (a+c)/(b+d) < a/b

b(a + c) < a(b + d)

ab + bc < ab + ad

bc < ad

Dividing both sides by bd, we have:

c/d < a/b

We see that II is not true.

III. (a+c)/(b+d) = a/b + c/d

Notice that this is an equation, not an inequality, and in general, this is not true regardless of whether a/b < c/d.

Answer: B

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