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16 Sep 2014, 00:15
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A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
25%
(medium)
Question Stats:
71% (01:01) correct
29%
(01:12)
wrong
based on 717
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What is the value of \(p^3 - q^3\)?
(1) \(p - q = 0\)
(2) \(p + q = 0\)
(1) \(p - q = 0\)
(2) \(p + q = 0\)
16 Sep 2014, 00:15
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Official Solution:
What is the value of \(p^3 - q^3\)?
(1) \(p-q=0\).
This statement implies \(p=q\). Thus, \(p^3-q^3=p^3-p^3=0\). Sufficient.
(2) \(p+q=0\).
The above implies that \(q=-p\). Hence, \(p^3-q^3=p^3-(-p^3)=2p^3\). The value of this expression depends on the value of \(p\). Not sufficient.
Answer: A
What is the value of \(p^3 - q^3\)?
(1) \(p-q=0\).
This statement implies \(p=q\). Thus, \(p^3-q^3=p^3-p^3=0\). Sufficient.
(2) \(p+q=0\).
The above implies that \(q=-p\). Hence, \(p^3-q^3=p^3-(-p^3)=2p^3\). The value of this expression depends on the value of \(p\). Not sufficient.
Answer: A
General Discussion
05 Feb 2015, 06:27
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Hi Bunuel,
I solved the question in the following way.
1)p-q=0;
(p-q)^3=0;
p^3-q^3-3p^2q-3pq^2=0;
p^3-q^3-3pq(p-q)=0;
//But we know that p-q=0
p^3-q^3=0//Sufficient
2)p+q=0;
From this we will get p^3+q^3 which is not sufficient.
Is this approach correct?
Thanks in advance.
I solved the question in the following way.
1)p-q=0;
(p-q)^3=0;
p^3-q^3-3p^2q-3pq^2=0;
p^3-q^3-3pq(p-q)=0;
//But we know that p-q=0
p^3-q^3=0//Sufficient
2)p+q=0;
From this we will get p^3+q^3 which is not sufficient.
Is this approach correct?
Thanks in advance.
