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If x is a not-zero number, is x^2 + 2x > x^2 + x?
(1) x^(odd integer) > x^(even integer)
(2) x^2 + x - 12 = 0
(1) x^(odd integer) > x^(even integer)
(2) x^2 + x - 12 = 0
24 Jul 2012, 21:19
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1.Simplify the original question by factoring:
x^2 + 2x > x^2 + x
2x > x
x > 0
Simplified question: is x > 0?
Evaluate Statement (1) alone.
When dealing with a number that is raised to an even exponent, it is important to remember that the sign of the base number can be either positive or negative (i.e., if x2 = 16, x = -4 and 4). Moreover, it is important to remember that raising a fraction to a larger exponent makes the resulting number smaller:
(1/2)2 > (1/2)3 > (1/2)4
There are three possible cases:
Case (1): x < 0
If x were negative, xodd would be negative while xeven would be positive. This would make xodd {=negative} < xeven {=positive}, which is an explicit contradiction of Statement (1). As a result, we know x cannot be negative. Statement (1) is SUFFICIENT. At this point, you should not keep evaluating since you know that Statement (1) provides enough information to answer the question "is x > 0?"
Case (2): 0 < x < 1
In this case, based upon what was shown above, for xodd integer > xeven integer to hold true, odd integer must be less than even integer.
Case (3): x > 1
This case is the opposite of Case (2). In other words, for xodd integer > xeven integer, the odd integer must be greater than the even integer.
Since Statement (1) eliminates the possibility of x being a negative number, we can definitively answer the question: is x > 0?
Statement (1) alone is SUFFICIENT.
Evaluate Statement (2) alone.
Factor x2 + x - 12 = 0
(x - 3)(x + 4) = 0
x = 3, -4
Since x can be either positive or negative, Statement (2) is not sufficient.
Statement (2) alone is NOT SUFFICIENT.
Since Statement (1) alone is SUFFICIENT but Statement (2) alone is NOT SUFFICIENT, answer A is correct
x^2 + 2x > x^2 + x
2x > x
x > 0
Simplified question: is x > 0?
Evaluate Statement (1) alone.
When dealing with a number that is raised to an even exponent, it is important to remember that the sign of the base number can be either positive or negative (i.e., if x2 = 16, x = -4 and 4). Moreover, it is important to remember that raising a fraction to a larger exponent makes the resulting number smaller:
(1/2)2 > (1/2)3 > (1/2)4
There are three possible cases:
Case (1): x < 0
If x were negative, xodd would be negative while xeven would be positive. This would make xodd {=negative} < xeven {=positive}, which is an explicit contradiction of Statement (1). As a result, we know x cannot be negative. Statement (1) is SUFFICIENT. At this point, you should not keep evaluating since you know that Statement (1) provides enough information to answer the question "is x > 0?"
Case (2): 0 < x < 1
In this case, based upon what was shown above, for xodd integer > xeven integer to hold true, odd integer must be less than even integer.
Case (3): x > 1
This case is the opposite of Case (2). In other words, for xodd integer > xeven integer, the odd integer must be greater than the even integer.
Since Statement (1) eliminates the possibility of x being a negative number, we can definitively answer the question: is x > 0?
Statement (1) alone is SUFFICIENT.
Evaluate Statement (2) alone.
Factor x2 + x - 12 = 0
(x - 3)(x + 4) = 0
x = 3, -4
Since x can be either positive or negative, Statement (2) is not sufficient.
Statement (2) alone is NOT SUFFICIENT.
Since Statement (1) alone is SUFFICIENT but Statement (2) alone is NOT SUFFICIENT, answer A is correct
25 Jul 2012, 03:18
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I am a bit confused, can you please help. Here is how i did it.
x NOT equal to 0
x^2 + 2x > x^2 + x
x ( x+2) > x(x+1)
( x+2) > (x+1)
Statement 1: x^odd integer > x^even integer
This means x Not equal to negative value or decimal, i.e x is a positive integer. Hence Sufficient
Statement 2: x^2 + x - 12 = 0
Solving this equation you get x = -4 or x =3
hence substituting the value in equation ( x+2) > (x+1)
-2 > -3 TRUE
5>4 TRUE
So for me answer seemed D.
What is wrong with the way i did it?
x NOT equal to 0
x^2 + 2x > x^2 + x
x ( x+2) > x(x+1)
( x+2) > (x+1)
Statement 1: x^odd integer > x^even integer
This means x Not equal to negative value or decimal, i.e x is a positive integer. Hence Sufficient
Statement 2: x^2 + x - 12 = 0
Solving this equation you get x = -4 or x =3
hence substituting the value in equation ( x+2) > (x+1)
-2 > -3 TRUE
5>4 TRUE
So for me answer seemed D.
What is wrong with the way i did it?
