Now, let's try to simplify the equation further. At this point, it may be helpful to rearrange the equation to isolate a variable or to further simplify it.
Unfortunately, grouping the terms and isolating a variable in this equation will not result in a simple solution. One way to proceed is to try a different approach or method to solve the system of equations.
To solve the system of equations, first expand the first equation:
(x-2)(y²+2) =
xy² + 2x - 2y² - 4 = 0
Now, let's substitute this expression into the second equation:
2x + y² =
2(x) + (xy² + 2x - 2y² - 4) =
2x + xy² + 2x - 2y² - 4 =
3x - 2y² + xy² = 12
Now, let's try to simplify the equation further. At this point, it may be helpful to rearrange the equation to isolate a variable or to further simplify it.
Unfortunately, grouping the terms and isolating a variable in this equation will not result in a simple solution. One way to proceed is to try a different approach or method to solve the system of equations.