I am solving this task:
You are given the lengths for each side on a triangle. You need to find all three angles for this triangle. If the given side lengths cannot form a triangle (or form a degenerated triangle), then you must return all angles as 0 (zero).
I already have solved it by using the law of cosines and now I am trying a different approach.
The idea is following: rotate two sides by one degree at a time, regarding to both ends of the third side and store coordinates and current angle to separate lists. The third side is used as an offset on X axis for the second side. Then checking is follow: are both lists have the same coordinate? If yes - the triangle construction from these sides is possible.
Animation of rotation:
- rotation happens by 10 degrees at a time for demonstration
- the E is the path's intersection point, if no intersection, then no triangle is possible.
The resulting triangle:
I have written the Python solution, but it doesn't work properly. The problem is: the coordinates of both sides doesn't match well, the approximation is needed.
For example: rotate side b to 90°, coords are (0.0, 4.0), rotate side c to 127°, coords are (-0.009, 3.993), so I need to compare these coordinates using approximation. In this case the 0.01
is enough. But another case can require 0.1
or more, like a = 11, b = 20, c = 30
. I tried to tailor approximation value relative to the side sizes, but without luck.
The question:
How can I calculate more accurate coordinates and why my solution doesn't work as expected?
Python solution:
#!/usr/bin/python3
from typing import List
from math import sin, cos, radians
def checkio(a: int, b: int, c: int) -> List[int]:
def coords(side, side_offset):
coord_list = []
for degree in range(0,181):
x = cos(radians(degree)) * side + side_offset
y = sin(radians(degree)) * side
coord_list.append((degree, x, y))
return coord_list
# make two lists with coordinates and degree, by rotating side "b" and side "c"
b_coord_list = coords(b, 0)
# the side "a" is used just as an offset
c_coord_list = coords(c, a)
for b_deg, b_x, b_y in b_coord_list:
for c_deg, c_x, c_y in c_coord_list:
# Approximate comparing
if abs(b_x - c_x) <= 0.01 and abs(b_y - c_y) <= 0.01:
l_angles = [b_deg, c_deg - b_deg, 180 - c_deg]
l_angles.sort()
# if all sides have angle, in other words if the triangle is possible
if all(l_angles):
return sorted(l_angles)
return [0, 0, 0]
### For testing:
#Good triangles
print(checkio(4, 4, 4))
print(checkio(3, 4, 5))
print(checkio(5, 4, 3))
print(checkio(11,20,30))
#Bad triangle
print(checkio(10, 20, 30))
calculate more accurate coordinates
are you referring tohe (inner) function
coords()? What do you mean by
more accurate`?if abs(b_x - c_x) <= 0.01 and abs(b_y - c_y) <= 0.01:
: are you saying you need the comparison value (0.01
) to by dynamic and depending on the functionsb
andc
arguments/parameters?a = 3, b = 4, c = 5
forms the triangle. Therefore, all sides should have the accurate intersection coordinates - vertexes. But mycoords
function doesn't return perfect coords, which can be comparing without tailored approximation. It returns so approximate coordinates, that I can't get precise angle of sides intersection with 1 degree accuracy.