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x<0
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25 Feb 2021, 05:13
25 Feb 2021, 05:13
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\(x<0\)
A)The quantity in Column A is greater.
B)The quantity in Column B is greater.
C)The two quantities are equal.
D)The relationship cannot be determined from the information given.
Kudos for the right answer and explanation
Question part of the project GRE Quantitative Reasoning Daily Challenge - (2021) EDITION
GRE - Math Book
Quantity A |
Quantity B |
\(x^2\) |
\(x^3\) |
A)The quantity in Column A is greater.
B)The quantity in Column B is greater.
C)The two quantities are equal.
D)The relationship cannot be determined from the information given.
Kudos for the right answer and explanation
Question part of the project GRE Quantitative Reasoning Daily Challenge - (2021) EDITION
GRE - Math Book
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x<0
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25 Feb 2021, 07:54
25 Feb 2021, 07:54
1
Carcass wrote:
\(x<0\)
Quantity A |
Quantity B |
\(x^2\) |
\(x^3\) |
APPROACH #1: Matching operations
Given:
Quantity A: \(x^2\)
Quantity B: \(x^3\)
Since we can be certain that \(x^2\) is POSITIVE, we can safely divide both quantities by \(x^2\) to get:
Quantity A: \(1\)
Quantity B: \(x\)
Since we're told \(x<0\), we can be certain that Quantity A is greater.
Answer: A
-----------------------------
APPROACH #2: Properties of exponents
Two important rules:
ODD exponents preserve the sign of the base.
So, (NEGATIVE)^(ODD integer) = NEGATIVE
and (POSITIVE)^(ODD integer) = POSITIVE
An EVEN exponent always yields a positive result (unless the base = 0)
So, (NEGATIVE)^(EVEN integer) = POSITIVE
and (POSITIVE)^(EVEN integer) = POSITIVE
Since x is NEGATIVE, we know that \(x^3\) must be NEGATIVE (since 3 is an ODD exponent)
Conversely, we know that \(x^2\) must be POSITIVE (since 2 is an EVEN exponent)
We have:
Quantity A: POSITIVE
Quantity B: NEGATIVE
Answer: A
RELATED VIDEO
Re: x<0
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25 Feb 2021, 07:54
25 Feb 2021, 07:54
1
Solution:
A rule to remember is whenever a positive on negative number is squared or has a even power it always yields a positive value. Whereas, when a number has an odd power the value changes according ti the sign if the number.
Here x<0
Therefore, it is negative. It could be an integer or a fraction. In both the case \(x^2>x^3\)
Qty A> Qty B
IMO A
A rule to remember is whenever a positive on negative number is squared or has a even power it always yields a positive value. Whereas, when a number has an odd power the value changes according ti the sign if the number.
Here x<0
Therefore, it is negative. It could be an integer or a fraction. In both the case \(x^2>x^3\)
Qty A> Qty B
IMO A
