An M-shaped curve is created by graphing the parabola $y=x^2$ in the coordinate plane, and then reflecting the part of the parabola that is above the line $y=1$ across the line $y=1$. There is a horizontal line that intersects the M-shaped curve at four points $A, B, C$, and $D$ so that $AB=BC=CD$. As a fraction in simplest radical form, what is the distance $\overline{AB}$?
The M-shaped curve is traced in red, and the four yellow dots represent A, B, C, D, from left to right, respectively.
I find the reflected parabola's equation to be $y=-x^2+2$ because it is a parabola opening downward shifted 2 up.
So I can say for $|x|\le1$, $y=x^2$; for $|x|\ge1$, $y=-x^2+2$. So it's a piecewise function.
I am stuck here. I assume I need to find solutions for $x$ from both parabola's equations, but I am not sure how. Help is appreciated!
Thanks!
Max0815
