This is an algebra problem that can be solved with systems of linear equations. http://en.wikipedia.org/wiki/System_of_linear_equations

Generally, a curve that passes through N points is an (N-1)th degree polynomial. So if you want to find a polynomial that passes through 3 points (e.g. `(-1,1), (0, 3), (1, -1)`

) you would need a quadratic equation like this: `ax^2+bx+c=y`

.

To find the values of a,b, and c, you need the plug the x and y coordinates in, then solve the system of equations.

a(-1)^2+b(-1)+c=1

a(0)^2+b(0)+c=3

a(1)^2+b(1)+c=-1

that simplifiles to

a-b+c=1

c=3

a+b+c=-1

Nicely, we already have *c=3*. By combining the first equation and the second we can get

2a+2c=0

Since we know c=3, this becomes

2a+3=0

So `a=-1.5`

.

From here we can put these values of a and c into the last equation to get this

-1.5+b+3=-1

Which gives a `b=-3.5`

. Plugging these values of a,b, and c back into the quadratic equation yields this

-1.5x^2-3.5x+3=y

I haven't double checked my math, but if I did it correctly, this will give a quadratic curve that passes through the three points.

Undoubtedly, there is already a library out there for doing this, but I'm sorry to say I don't know what that would be. Hopefully, knowing about the math behind your problem will help you find your answer.