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17 Mar 2020, 01:35
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
35%
(medium)
Question Stats:
66% (01:39) correct
34%
(01:38)
wrong
based on 174
sessions
History
Date
Time
Result
Not Attempted Yet
What is the value of p − q ?
(1) \(16p^2 = 64 + 16q^2\)
(2) \(p^2 = 36\)
17 Mar 2020, 02:15
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Quote:
Question: p-q = ?
Statement 1: \(16p^2=64+16q^2\)
\(16p^2=64+16q^2\)
i.e. \(p^2 - q^2=4\)
i.e. \((p - q)*(p + q)=4\)
Many possibilities of p - q hence
NOT SUFFICIENT
Statement 2: p^2=36
i.e. p = +6 but no information of q hence
NOT SUFFICIENT
COmbining the statements
p = +6 and \(p^2 - q^2=4\)
i.e. \(q^2 = 6^2 - 4 = 32\)
i.e. q = +4√2
Still values of p-q can take many values hence
NOT SUFFICIENT
Answer: Option E
17 Mar 2020, 02:26
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We are to determine the value of p-q
Statement 1: 16p^2=64+16q^2
From statement 1, p^2-q^2=4
hence (p-q)=4/(p+q)
We have no idea what p+q is, we are therefore unable to find p-q. Statement 1 is insufficient.
Statement 2: p^2=36
From statement 2, p=-6, or p=6
Statement 2 is insufficient since we have no idea the value of q, and besides, since p has two possible values, it is likely to result in different values of p-q.
1+2
q^2=32 hence q=-4√2 or q=4√2
any combination of the possible values of p and q yields p^2-q^2=4 but different values of p-q. For instance when p=6 and q=4√2, p-q=6-4√2=2(3-2√2)
when p=6 and q=-4√2, p-q=6+4√2=2(3+2√2)
Hence 1+2 are still not sufficient.
The answer is E.
Statement 1: 16p^2=64+16q^2
From statement 1, p^2-q^2=4
hence (p-q)=4/(p+q)
We have no idea what p+q is, we are therefore unable to find p-q. Statement 1 is insufficient.
Statement 2: p^2=36
From statement 2, p=-6, or p=6
Statement 2 is insufficient since we have no idea the value of q, and besides, since p has two possible values, it is likely to result in different values of p-q.
1+2
q^2=32 hence q=-4√2 or q=4√2
any combination of the possible values of p and q yields p^2-q^2=4 but different values of p-q. For instance when p=6 and q=4√2, p-q=6-4√2=2(3-2√2)
when p=6 and q=-4√2, p-q=6+4√2=2(3+2√2)
Hence 1+2 are still not sufficient.
The answer is E.
