Question

Finding all real solutions in a system of equations?

The system of equations is:
`x^3-3xy^2=1 and`

`3x^2y-y^3=1`

Answer 1

`(x, y) = (1/4root(6)(2)(sqrt(6)+sqrt(2)), 1/4root(6)(2)(sqrt(6)-sqrt(2)))`

`(x, y) = (-root(3)(4)/2, root(3)(4)/2)`

`(x, y) = (-1/4root(6)(2)(sqrt(6)-sqrt(2)), -1/4root(6)(2)(sqrt(6)+sqrt(2)))`

Explanation:

Given:

`{ (x^3-3xy^2=1), (3x^2y-y^3=1) :}`

Adding `i` times the second equation to the first, we get:

`1+i = x^3+3ix^2y-3xy^2-iy^3`

`color(white)(1+i) = x^3+3x^2(iy)+3x(iy)^2+(iy)^3`

`color(white)(1+i) = (x+iy)^3`

Now:

`1+i = sqrt(2)(cos (pi/4)+i sin (pi/4))`

So:

`x+iy = root(6)(2)(cos (pi/12+(2npi)/3) + i sin (pi/12+(2npi)/3))`

for `n = 0, 1, 2`

Equating real and imaginary parts gives us real solutions to the original system:

`(x, y) = (root(6)(2)cos(pi/12), root(6)(2)sin(pi/12)) = (1/4root(6)(2)(sqrt(6)+sqrt(2)), 1/4root(6)(2)(sqrt(6)-sqrt(2)))`

`(x, y) = (root(6)(2)cos((3pi)/4), root(6)(2)sin((3pi)/4)) = (-root(3)(4)/2, root(3)(4)/2)`

`(x, y) = (root(6)(2)cos((17pi)/12), root(6)(2)sin((17pi)/12)) = (-1/4root(6)(2)(sqrt(6)-sqrt(2)), -1/4root(6)(2)(sqrt(6)+sqrt(2)))`