Personally I think simplifying the expression is the easiest way to solve this:
xy + z = xy + xz
cross out the xy and bring the z terms to one side:
z - xz = 0
z(1-x) = 0
z = 0 and 1-x = 0
1-x = 0 -> -x = -1 -> x = 1
xy + z = x(y + z), which of the following must be true?
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Brent@GMATPrepNow
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I have a feeling that you took the values of x and z in answer choice A and plugged them into the equation.cgc wrote:xy + z = x(y + z), which of the following must be true?
a. x=0, z=0
b. x=1, y=1
c. y=1, z=0
d. x=1, y=0
e. x=1, z=0
why is the answer e not a?
please explain. thanks,
This is an okay strategy, but you are really solving the question "Which of the following could be true?"
You'll see that, if you plug in the values from B, C and E, they will work as well.
To anwer the question, "Which of the following must be true?," follow the steps that aakar used.
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So if i understand correctly, i solve the equation by expanding/factoring to get "zero" on one side. Same as solving a quadratic equation. Correct?
This is the way to determine what MUST be true for the remaining variables in an equation.
Thanks,
This is the way to determine what MUST be true for the remaining variables in an equation.
Thanks,
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Testluv
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I discussed this question here, and gave some associated tips:
https://www.beatthegmat.com/gmat-prep-i- ... tml#211948
Note that you could have picked numbers, but you would have to check ALL answer choices, eliminating the impossible choices. This would leave you with A and E, at which point you would have to ask which must be true, which again, you can pick numbers to see.
But, definitely the best approach is algebraic here.
https://www.beatthegmat.com/gmat-prep-i- ... tml#211948
Note that you could have picked numbers, but you would have to check ALL answer choices, eliminating the impossible choices. This would leave you with A and E, at which point you would have to ask which must be true, which again, you can pick numbers to see.
But, definitely the best approach is algebraic here.
Kaplan Teacher in Toronto
