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x^2-y^2<8, x+y>3
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29 Jun 2018, 17:37
29 Jun 2018, 17:37
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Question Stats:
57% (02:29) correct
42% (02:16) wrong based on 80 sessions
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\(x^{2}-y^{2}< 8\)
\(x+y>3\)
If x and y are integers in the above inequalities and 0 < y < x, what is the greatest possible value of x?
\(x+y>3\)
If x and y are integers in the above inequalities and 0 < y < x, what is the greatest possible value of x?
Show: :: OA
4
Re: x^2-y^2<8, x+y>3
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30 Jun 2018, 16:52
30 Jun 2018, 16:52
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What is the source of this question. PS: OA means official answer.
I am not sure if this is a GRE question. THIS IS A BAD QUESTION.
condition 1: x+y>3
condition 2: \(x^{2}-y^{2}< 8\)
We start by picking numbers. So the difference between squares has to be less than 8.
condition 1: x+y>3
condition 2: \(x^{2}-y^{2}< 8\)
For example 1,3 now \(3^2-1^2 = 8\) and \(3+1=4\) condition 1 is statisfied condition 2 is not.
Next pair is 3,4. So \(4^2-3^2 = 7\) and and \(3+4=7\). This satisfies but this may not be the gratest value of x. Try the next pair. 5,4
\(5^2-4^2 = 9\) SO not true.
\(6^2-5^2 = 11\)
\(7^2-6^2 = 13\)
Note that the difference between consecutive squares keep on increasing. So 3,4 is the only viable pair.
HERE is why this is a BAD question. \(y>x\).
Say y=1000 x=500.
\(x+y =1500\) holds
\(x^2-y^2=-750000 < 8\) holds
Now here x can have infinitely many values. x=1 and y=1000 holds so does x=999 and y=1000. Also y can have any value.
I am not sure if this is a GRE question. THIS IS A BAD QUESTION.
condition 1: x+y>3
condition 2: \(x^{2}-y^{2}< 8\)
We start by picking numbers. So the difference between squares has to be less than 8.
condition 1: x+y>3
condition 2: \(x^{2}-y^{2}< 8\)
For example 1,3 now \(3^2-1^2 = 8\) and \(3+1=4\) condition 1 is statisfied condition 2 is not.
Next pair is 3,4. So \(4^2-3^2 = 7\) and and \(3+4=7\). This satisfies but this may not be the gratest value of x. Try the next pair. 5,4
\(5^2-4^2 = 9\) SO not true.
\(6^2-5^2 = 11\)
\(7^2-6^2 = 13\)
Note that the difference between consecutive squares keep on increasing. So 3,4 is the only viable pair.
HERE is why this is a BAD question. \(y>x\).
Say y=1000 x=500.
\(x+y =1500\) holds
\(x^2-y^2=-750000 < 8\) holds
Now here x can have infinitely many values. x=1 and y=1000 holds so does x=999 and y=1000. Also y can have any value.
Re: x^2-y^2<8, x+y>3
[#permalink]
09 Jul 2018, 14:01
09 Jul 2018, 14:01
7
theAlbatross wrote:
\(x^{2}-y^{2}< 8\)
x+y>3
If x and y are integers in the above inequalities and 0 < y < x, what is the greatest possible value of x? _____
x+y>3
If x and y are integers in the above inequalities and 0 < y < x, what is the greatest possible value of x? _____
Since \(x\) and \(y\) are positive integers, \(x^2\) and \(y^2\) are PERFECT SQUARES, implying that \(x^2-y^2\)is equal to the difference of two perfect squares.
Make list of perfect squares:
1, 4, 9, 16, 25...
Since \(x^2 - y^2 < 8\), the value of x will be maximized if \(x^2\) and \(y^2\) are the perfect squares in blue, which have a difference of 7.
Thus:
\(x^2 = 16\), implying that the greatest possible value of \(x=4\).
The inequality in red is not necessary to solve the problem.
