To solve this equation, we first need to expand the terms:
1−x1-x1−x^2 - x1+x1+x1+x = 0
Expanding the terms gives:
1−2x+x21 - 2x + x^21−2x+x2 - x - x^2 = 0
Now we can simplify the equation:
1 - 2x + x^2 - x - x^2 = 01 - 3x = 0
Now we can solve for x:
1 - 3x = 03x = 1x = 1/3
Therefore, the solution to the equation 1−x1-x1−x^2 - x1+x1+x1+x = 0 is x = 1/3.
To solve this equation, we first need to expand the terms:
1−x1-x1−x^2 - x1+x1+x1+x = 0
Expanding the terms gives:
1−2x+x21 - 2x + x^21−2x+x2 - x - x^2 = 0
Now we can simplify the equation:
1 - 2x + x^2 - x - x^2 = 0
1 - 3x = 0
Now we can solve for x:
1 - 3x = 0
3x = 1
x = 1/3
Therefore, the solution to the equation 1−x1-x1−x^2 - x1+x1+x1+x = 0 is x = 1/3.