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If \(XY\) is divisible by 4, which of the following must be true?

(A) If \(X\) is even then \(Y\) is odd. (B) If \(X = \sqrt{2}\) then \(Y\) is not a positive integer. (C) If \(X\) is 0 then \(X + Y\) is not 0. (D) \(X^Y\) is even. (E) \(\frac{X}{Y}\) is not an integer.

XY must be an integer because when a number is divisible by an integer, this means that the quotient MUST be an integer. Sure you can divide 8.12 by 4, you get 2.03, but that does not mean that 8.12 is divisible by 4. divisibility implies no decimal remainders.

SO XY must be an integer. What I'm not sure of though with this question is why must Y NOT be a positive integer?

pmal04 wrote:

The OE is not making sense to me. Why XY has to be an integer? why can't it be 8*root2?

_________________

------------------------------------ J Allen Morris **I'm pretty sure I'm right, but then again, I'm just a guy with his head up his a$$.

I agree with you regarding "positive integer". This doesn't make any sense. Maybe there is something that I do not understand, but I see no reason that "positive" matters.

pmal04 wrote:

Thanks jallenmorris for your reply. +1 for you. Also, I am not sure why must Y NOT be a positive integer. Can founder please explain it?

_________________

------------------------------------ J Allen Morris **I'm pretty sure I'm right, but then again, I'm just a guy with his head up his a$$.

Thanks guys. +1 to both of you. We deleted the "positive" and now it reads "not an integer" in option B.

Dzyubam, I think you were right at the beginning.

The reason you need "positive" in (B), if X is SQRT(2), Y is not a "POSITIVE" integer, is because if X is SQRT(2), Y can still be zero, which does not violate the condition.

However, if the answer choice is changed to Y is not an integer, then X = SQRT (2), Y = 0, and XY = 0 and divisible by 4. Y IS an integer so the statement isn't true.

The other statements don't work either, so I think you need to change it back to "Positive."

_________________

------------------------------------ J Allen Morris **I'm pretty sure I'm right, but then again, I'm just a guy with his head up his a$$.

As already told by bipolarbear, if \(X=\sqrt{2}\) and \(Y=0\), then \(XY=0\) and it is divisible by 4. If option B doesn't have "positive integer", then B is violated as 0 is an integer (neither positive nor negative).

The OE is not making sense to me. Why XY has to be an integer? why can't it be 8*root2?

However B implies that y can be a -ve integer, which is not true. If x = sqrt2, y is neither a +ve nor a -ve integer. Yes it could be 0 or n(sqrt2) where n is an even integer.

Looks like answer choice "B" needs to be revised in a more absolute way.
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I think that B is correct as it is because at least we know that Y cannot be a positive integer. We do not know whether Y may or may not be a negative integer at this point.

Hmm... since x=sqrt(2), the value of y can well be y=4/sqrt(2) or y=8/sqrt(2) or so on...(or, as mentioned before y=0) In that case y is not even an integer (forget it being positive or negative)...

I'm not sure I completely understand your specific question, but I'll attempt to explain why the correct answer to this problem is not D.

D. X^Y is Even.

Well, the stem tesll us to assume that XY is divisible by 4, and then we have to determine if D must be true.

We know that D is not necessarily true. You are correct in that if X is ODD, then Y could be divisible by 4 and therefore XY would be divisible by 4. However, this isn't exaclty what the question is getting at.

X^Y could be ODD. Lets say you have a situation where XY = 104 (X=13 Y = 8) 13^8 = ODD number (an odd*odd will always = odd). Therefore it is false to say "If XY is dividisble by for, then X^Y must always be odd."

Francois wrote:

Shouldn t it be D.

In fact if X is odd. Then for XY to be divisible by four we need Y to be divisble by four hence Y is even hence x^ y is even

if x is even then whatever y such as xy divisble by 4 x^ y will be even

Posted from my mobile device

_________________

------------------------------------ J Allen Morris **I'm pretty sure I'm right, but then again, I'm just a guy with his head up his a$$.

If XY = 12(3*4), X^Y = 3*4 . then 3 ^ 4 = 81 (odd). If X = 8 (2*4) , X^Y= 2^4 = 16(even)

i feel like we shud beware of MUST BE TRUE q's. these q's demand that the correct answer choice should be true in all cases. this is not same as CAN BE TRUE q's.

Also, in B option , it says Y cannot be a positive integer if X=sqrt(2). it is not possible for Y to be positive or negative integer. but as others have already mentioned Y can be 0. so i feel like it should be " Y cannot be positive or negative integer" .

If XY is divisible by 4, which of the following must be true?

(A) If X is even then Y is odd --> X=4 Y =4 XY is disivible by 4, X is even and Y is not odd--> Eliminate B) If X=2^1/2 then Y is not a positive integer --> keep (C) If X is 0 then X + Y is not 0 --> X = 0 and Y =0 , then XY divisible by 4 --> eliminate (D) X^Y is even --> X=3, Y = 4 then XY is divisible by 4 and X^Y=81 even--> eliminate (E) X/Y is not an integer.--> X=4 and Y=4 then X/Y=1--> eliminate

Hence can only be B by elimination. Prove that B is true:

if X=2^1/2 there is no integer such as XY is divisible by 4 except 0. In fact Y needs to be divisible by 4 but XY divided by 4 will have a reminder as X = 2^1/2 Hence saying Y is not a positive integer is correct as 0 is the only solution. Please correct me if I am wrong

If XY has to be zero to be right answer, Why option C is not correct?

If X = 0 then XY= 0, So devisible by 4

(C): If X is 0 then X + Y is not 0. (a) Consider X=0, Y=1; XY=0, hence divisible by 4 and X+Y = 1 (b) Consider X=0, Y=0; XY=0, hence divisible by 4 and X+Y = 0 You'll agree that option C contradicts (b), and is thus wrong.
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If XY is divisible by 4, which of the following must be true?

(A) If X is even then Y is odd --> X=4 Y =4 XY is disivible by 4, X is even and Y is not odd--> Eliminate B) If X=2^1/2 then Y is not a positive integer --> keep (C) If X is 0 then X + Y is not 0 --> X = 0 and Y =0 , then XY divisible by 4 --> eliminate (D) X^Y is even --> X=3, Y = 4 then XY is divisible by 4 and X^Y=81 even--> eliminate (E) X/Y is not an integer.--> X=4 and Y=4 then X/Y=1--> eliminate

Hence can only be B by elimination. Prove that B is true:

if X=2^1/2 there is no integer such as XY is divisible by 4 except 0. In fact Y needs to be divisible by 4 but XY divided by 4 will have a reminder as X = 2^1/2 Hence saying Y is not a positive integer is correct as 0 is the only solution. Please correct me if I am wrong

XY divisible by 4: X= √2, Y= 0 => XY = 0 (divisible by 4)...satisfied X= √2, Y= 8√2 => XY = 32 (divisible by 4)...satisfied X= √2, Y= -8√2 => XY = -32 (divisible by 4)...satisfied

In the first case, Y=0 - not a positive integer...satisfied In the 2nd case, Y=8√2 -not a positive integer...satisfied
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