Solve for X - Y
X + KY = 7
KX + Y - X = 10
A. (7-10K) / (1 + K+ K^2)
B. (7K-3) / (K^2 - K -1)
C. (10+3K) / (K^2 - K -1)
D. (3K-4) / (K^2 - K -1)
E. (4-7K) / (K^2 + K +1)
Please assist.
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Solve for x - y
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govind_raj_76
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aloneontheedge
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In these kind of situations it is always helpful to plug valuesgovind_raj_76 wrote:Solve for X - Y
X + KY = 7
KX + Y - X = 10
A. (7-10K) / (1 + K+ K^2)
B. (7K-3) / (K^2 - K -1)
C. (10+3K) / (K^2 - K -1)
D. (3K-4) / (K^2 - K -1)
E. (4-7K) / (K^2 + K +1)
Please assist.
lets say K= 2 then X= 13 Y = -3
x-y = 16
substitute these values in the options
we find C = 16
Pick C
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kanagasu
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I guess the best solution would be a general Algebric solving method.
Given two equations are :
X+KY = 7 ----- (1)
KX+Y-X = 10 ----- (2)
Since we have all the options in terms of K, lets make X and Y in terms of K.
From the first equation we have Y = (7-X)/K
Substitue this into the Second equation.
Where we get X as, X = (10K - 7)/ (K^2 -K -1) ----------- Equation A
Now again from the first equation we have X= 7-kY, lets substitute this in the second equation.
Where we get Y as, Y = (7K-17)/(K^2-K-1) ---------------Equation B
Lets subtract A and B
We get X-Y = 3K+10 /(K^2-K-1)
hence, C is the answer.
Thought it might seem lengthy, I guess it works more efficiently than plugging in some arbitrary values (In this case).
Cheers,
Suresh
Given two equations are :
X+KY = 7 ----- (1)
KX+Y-X = 10 ----- (2)
Since we have all the options in terms of K, lets make X and Y in terms of K.
From the first equation we have Y = (7-X)/K
Substitue this into the Second equation.
Where we get X as, X = (10K - 7)/ (K^2 -K -1) ----------- Equation A
Now again from the first equation we have X= 7-kY, lets substitute this in the second equation.
Where we get Y as, Y = (7K-17)/(K^2-K-1) ---------------Equation B
Lets subtract A and B
We get X-Y = 3K+10 /(K^2-K-1)
hence, C is the answer.
Thought it might seem lengthy, I guess it works more efficiently than plugging in some arbitrary values (In this case).
Cheers,
Suresh
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Stuart@KaplanGMAT
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Hi,sandysai wrote:Hi Alone...
How did you come up with these smart numbers guess. i had troubling selecting the right numbers which satisfies both the equations.
is there any technique to do that
Alone simply picked a nice simply value for k, then solved the two equations with k=2.
Plugging in:
x + 2y = 7
2x + y - x = 10
(simplifying the second equation)
x + y = 10
Now we have two equations and two unknowns, so we can solve. Let's subtract the second equation from the first:
x + 2y = 7
-(x + y = 10)
y = -3
and subbing y = -3 into the second equation:
x + (-3) = 10
x = 13
So:
x - y = 13 - (-3) = 16
Now we plug k=2 into the choices and look for the one that works out to 16.
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aloneontheedge
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Sorry buddy did not see the post.sandysai wrote:Hi Alone...
How did you come up with these smart numbers guess. i had troubling selecting the right numbers which satisfies both the equations.
is there any technique to do that
Stuart has already answered this.
Just pick some number and plug in.Plug the same values in answer choices and both should be equal.
Probably,at times when u pick a number,u might end up with 2 answers choices which satisfy,in such cases plug some different numbers and check for them(usually happens in number system probs which asks for even r definetely odd)
Thank you very much Stuart Kovinsky. I understood clearly.Stuart Kovinsky wrote:Hi,sandysai wrote:Hi Alone...
How did you come up with these smart numbers guess. i had troubling selecting the right numbers which satisfies both the equations.
is there any technique to do that
Alone simply picked a nice simply value for k, then solved the two equations with k=2.
Plugging in:
x + 2y = 7
2x + y - x = 10
(simplifying the second equation)
x + y = 10
Now we have two equations and two unknowns, so we can solve. Let's subtract the second equation from the first:
x + 2y = 7
-(x + y = 10)
y = -3
and subbing y = -3 into the second equation:
x + (-3) = 10
x = 13
So:
x - y = 13 - (-3) = 16
Now we plug k=2 into the choices and look for the one that works out to 16.
