Suppose we have a system of linear equations: x 2 </msup> &#x2212;<!-- - --> x

dourtuntellorvl

dourtuntellorvl

Answered question

2022-06-14

Suppose we have a system of linear equations:
x 2 x + y 2 y = n
x 2 + y 2 x y + 2 x y = 2 n where n Z +

Answer & Explanation

upornompe

upornompe

Beginner2022-06-15Added 20 answers

Step 1
The original question has changed. The original question was asking for integer solutions (x,y) to the system of equations
x 2 + y 2 x y = n
and
x 2 + y 2 x y + 2 x y = 2 n
where n is also an integer.
If you subtract the first equation from the second, we find that n = 2 x y Substituting that in the first expression and letting Y = x + y and X = x y , the first expression then writes as Y = X 2 , which is a parabola.
Now, we need to find pairs of integers for which their sum is equal the square of their difference. So, let N such that x + y = N 2 and x y = N for some integer N. Solving for this linear system of equations yields
x = N 2 ( N + 1 )   a n d   y = N 2 ( N 1 ) .
It is interesting to note that the expressions above always yield integer values for all N > 1 This means that those formulas generate all the pairs (x,y) for which the original system of equations holds. Moreover, we can find n using the formula n = 2 x y which is given here by
n = N 2 4 ( N 2 1 ) .
For the example you gave, this corresponds to N = 6 , from which we get x = 21 , and n = 630

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