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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
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The stem is pretty straight: 3 consecutive numbers and integers.

Pick 1,2,3

D) \((x + 3)yz\) \(= 4*6=24\) divisible by 3

F) \((x + 1)(y + 2)(z + 3) = 2*4*6= 48\) divisible by 3

Each number above has a number divisible by 3 inside. So they must be divisible by 3

Hope this helps

PS: more often than not is useful picking number strategy instead to think theoretically, especially when you are not at that level.

Regards
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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
Why not B & C?
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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
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Akash03jain wrote:
Why not B & C?



Thanks Carcass. Back to your question, the reason simply because 3,4,5 in B are 4 * 4 * 5 does not have 3 prime factor, so it's not divisible. Same with C.
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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
Why are we not considering the possibility that the integers are negative?

what if we pick x=-3, y=-2, z=-1? Then only A is satisfied...
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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
GreenlightTestPrep wrote:
bellavarghese wrote:
Why are we not considering the possibility that the integers are negative?

what if we pick x=-3, y=-2, z=-1? Then only A is satisfied...


If x=-3, y=-2, z=-1, then A, D, E and F are divisible by 3.

KEY CONCEPT: O is divisible by 3 (but I've never seen an OFFICIAL GRE question that tests this)

Cheers,
Brent

oh. That's new info for me. Thanks!
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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
If we select 1,2 and 3 for x,y and z respectively, B and C can eval to true

B) (x + 1)yz = y * y * z ( since z is 3, any multiple of 3 is divisible by 3 )

C) (x + 2)yz = z * y * z ( following the same logic )

Can anyone explain why this is not possible?
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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
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Now, if either y or z is a multiple of 3, then the expressions in choices B and C will also be divisible by 3, but you do not know for certain which of x, y, and z is the multiple of

B and C are not MUST be true
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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
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A key fact to remember: Product of N sequential numbers is always divisible by N!



So since there are 3 consecutive numbers, the product of them must be divisible by 3!=6. By extension, the product must be divisible by 3 (remember divisibility rules).

Let's try this for each of the answer choices.
A) xyz - True, by definition above

B) (x + 1)yz - False, This is equivalent to y,y,z, which aren't 3 consecutive numbers.

C) (x + 2)yz - False - same reasoning as above


D) (x + 3)yz - True, This is the same as 3 consecutive numbers that start at y.

E) (x + 1)(y + 1)(z + 1) - True, these are 3 consecutive numbers

F) (x + 1)(y + 2)(z + 3) - True, this one is a bit more tricky. This is essentially skipping every other number, which you can factor out into the form \(Xn(n+1)(n+2)\), which is divisible by 6, and by extension, 3.
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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
hongj77 wrote:

A key fact to remember: Product of N sequential numbers is always divisible by N!



So since there are 3 consecutive numbers, the product of them must be divisible by 3!=6. By extension, the product must be divisible by 3 (remember divisibility rules).

Let's try this for each of the answer choices.
A) xyz - True, by definition above

B) (x + 1)yz - False, This is equivalent to y,y,z, which aren't 3 consecutive numbers.

C) (x + 2)yz - False - same reasoning as above


D) (x + 3)yz - True, This is the same as 3 consecutive numbers that start at y.

E) (x + 1)(y + 1)(z + 1) - True, these are 3 consecutive numbers

F) (x + 1)(y + 2)(z + 3) - True, this one is a bit more tricky. This is essentially skipping every other number, which you can factor out into the form \(Xn(n+1)(n+2)\), which is divisible by 6, and by extension, 3.


Hi, thanks for the great explanation. for F, how can you factor out consecutive odd numbers? if they are consecutive even numbers, let's say 4.6.8=2 (2.3.4), it can be factored out, but for odd numbers, let's say 3.5.7 , is it possible?
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x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
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Hi,

The stem says \(x , y , z\) are consecutive nos. Hence they are either ODD, EVEN, ODD or EVEN, ODD, EVEN

We can't assume consecutive even or odd. Stick to the stem.

gre29979245 wrote:
hongj77 wrote:

A key fact to remember: Product of N sequential numbers is always divisible by N!



So since there are 3 consecutive numbers, the product of them must be divisible by 3!=6. By extension, the product must be divisible by 3 (remember divisibility rules).

Let's try this for each of the answer choices.
A) xyz - True, by definition above

B) (x + 1)yz - False, This is equivalent to y,y,z, which aren't 3 consecutive numbers.

C) (x + 2)yz - False - same reasoning as above


D) (x + 3)yz - True, This is the same as 3 consecutive numbers that start at y.

E) (x + 1)(y + 1)(z + 1) - True, these are 3 consecutive numbers

F) (x + 1)(y + 2)(z + 3) - True, this one is a bit more tricky. This is essentially skipping every other number, which you can factor out into the form \(Xn(n+1)(n+2)\), which is divisible by 6, and by extension, 3.


Hi, thanks for the great explanation. for F, how can you factor out consecutive odd numbers? if they are consecutive even numbers, let's say 4.6.8=2 (2.3.4), it can be factored out, but for odd numbers, let's say 3.5.7 , is it possible?
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x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
rx10 wrote:
Hi,

The stem says \(x , y , z\) are consecutive nos. Hence they are either ODD, EVEN, ODD or EVEN, ODD, EVEN

We can't assume consecutive even or odd. Stick to the stem.

gre29979245 wrote:
hongj77 wrote:

A key fact to remember: Product of N sequential numbers is always divisible by N!



So since there are 3 consecutive numbers, the product of them must be divisible by 3!=6. By extension, the product must be divisible by 3 (remember divisibility rules).

Let's try this for each of the answer choices.
A) xyz - True, by definition above

B) (x + 1)yz - False, This is equivalent to y,y,z, which aren't 3 consecutive numbers.

C) (x + 2)yz - False - same reasoning as above


D) (x + 3)yz - True, This is the same as 3 consecutive numbers that start at y.

E) (x + 1)(y + 1)(z + 1) - True, these are 3 consecutive numbers

F) (x + 1)(y + 2)(z + 3) - True, this one is a bit more tricky. This is essentially skipping every other number, which you can factor out into the form \(Xn(n+1)(n+2)\), which is divisible by 6, and by extension, 3.


Hi, thanks for the great explanation. for F, how can you factor out consecutive odd numbers? if they are consecutive even numbers, let's say 4.6.8=2 (2.3.4), it can be factored out, but for odd numbers, let's say 3.5.7 , is it possible?



right. We have to stick to the stem. but my question is regarding the last point in hongj77's post. so, the last option is basically consecutive even or odd numbers . that is also written in the manhattan solution. But that is not my question here. As he explained we can factor out the term (x + 1)(y + 2)(z + 3) into X * n(n+1)(n+2)(n+2), but I am not able to do it for any odd numbers (e.g. 5.7.9), though for even numbers (e.g. 4.6.8) it is doable. So for a series of odd numbers, how it can be done. That is my question.
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Re: x, y, and z are consecutive integers, where x < y < z. Whic [#permalink]
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The way I figured out option F is I thought:

We know x, y, or z is divisible by 3. If x was the one divisible by 3, then x+1 is not divisible by 3, but y+2 would be divisible by 3. For example: The case [3,4,5]. 4+2=6.

To generalize: y is one more than x, so y+2 is three more than x. If x is divisible by 3, then x+3 is divisible by 3.

If y was the one divisible by 3, then y+2 is not divisible by 3. But x+1 is y, so x+1 is divisible by 3.

If z is divisible by 3, then z+3 is divisible by 3.
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