Your problem here is that your code is formatted so badly, you can't see the errors with parentheses that you're making.
Error 1
For instance, this line:
sideA = math.sqrt((x - mousex)**2)+((y - mousey)**2)
when formatted properly, looks like this:
sideA = math.sqrt((x - mousex) ** 2) + ((y - mousey) ** 2)
and when you remove the redundant parentheses, you can see what's happening even more clearly:
sideA = math.sqrt((x - mousex) ** 2) + (y - mousey) ** 2
You're only passing the square of one of your sides to math.sqrt()
, and just adding the square of the second side to it. It should be:
sideA = math.sqrt((x - mousex) ** 2 + (y - mousey) ** 2)
or even better:
sideA = math.hypot(x - mousex, y - mousey)
Error 2
Then this line:
cos = float(sideA**2)-(sideB**2)-(sideC**2)/(-2*(sideB*sideC))
has a similar problem - you're missing parentheses around those first three terms, and you're only dividing the square of side C by 2bc. It should be:
cos = (sideA ** 2 - sideB ** 2 - sideC ** 2) / ( -2 * sideB * sideC)
Solution
As a result of the above, you're not calculating the cosine correctly, so what you're passing to math.acos()
is way out of an allowable range for a cosine (a cosine will always be in the range -1 <= cos A <= 1
), so it's giving you that domain error. Printing out your values would have helped see you were getting something really strange, here.
Here's a fixed and working version of your program, modified to just set values directly for mousex
and mousey
:
#!/usr/bin/env python
import math
x, y = 100, 100
centerX, centerY = x + 50, y + 50
mousex, mousey = 100,150
sideA = math.hypot(x - mousex, y - mousey);
sideB = math.hypot(centerX - mousex, centerY - mousey)
sideC = math.hypot(centerX - x, centerY - y)
cosA = (sideB ** 2 + sideC ** 2 - sideA ** 2) / (2 * sideB * sideC)
angle = math.acos(cosA)
print "sideA: %.2f, sideB: %.2f, sideC: %.2f" % (sideA, sideB, sideC)
print "cosA: %.6f" % (cosA)
print "angle: %.2f radians, %.2f degrees" % (angle, math.degrees(angle))
which outputs:
paul@horus:~/src/sandbox$ ./angle.py
sideA: 50.00, sideB: 50.00, sideC: 70.71
cosA: 0.707107
angle: 0.79 radians, 45.00 degrees
paul@horus:~/src/sandbox$
I've taken the liberty of rearranging your cosine rule calculation slightly to eliminate the need to negate the denominator.