## Line Equations in Python

The other day I was playing with some Python challenges found on a popular sites, this challenge worked with xy coordinates on a 2D plane.

I wanted to show some of the code I wrote and how they work.

## The Plane

Being the data is a tuple of x, y coordinates we will use the Cartesian Coordinate System.

I started my code off as a simple Python class:

```class Line(object):

def __init__(self, data):
self.first, self.second = data```

Using this Class I can input two points in a tuple like this:

`data = ((1,1), (2,3))`

These coordinates would look like this on a 2D plane:

## The Line

The coordinates ((1,1), (2,3)) holds quite a bit of data when it comes to the terms of Algebra.

### Slope

The Slope of a line will tell us how steep it is, and can be calculated with the change in Y / change int X.

```def slope(self):
'''Get the slope of a line segment'''
(x1, y1), (x2, y2) = self.first, self.second
try:
return (float(y2)-y1)/(float(x2)-x1)
except ZeroDivisionError:
# line is vertical
return None```

Using the slope method tells us this line has a slope of 2.

```>>> data = ((1,1), (2,3))

>>> line = Line(data)

>>> m = line.slope()

>>> print m
2.0```

### Y Intercept

The Y Intercept tells us at what point a line will meet the Y axis. To get a Y Intercept we use the equation b = y – mx where m is our slope.

```def yintercept(self, slope):
'''Get the y intercept of a line segment'''
if slope != None:
x, y = self.first
return y - slope * x
else:
return None```

And if we plug all our data back in we get a intercept of -1:

```>>> b = line.yintercept(slope)

>>> print b
-1.0```

### Solve for Y

Now that we know the slope of our line, and where our line meets the Y Axis we can plug in any X coordinate and solve for where Y will be:

```def solve_for_y(self, x, slope, yintercept):
'''Solve for Y cord using line equation'''
if slope != None and yintercept != None:
return float(slope) * x + float(yintercept)
else:
raise Exception('Can not solve on a vertical line')```

And just like that we can when X is equal to 3 our Y will be 5, just look at the graph above and imagaine.

```>>> line.solve_for_y(3, m, b)
5.0```

### Solve for X

And lastly using our slope and Y intercept we can solve for X when Y is some value:

```def solve_for_x(self, y, slope, yintercept):
'''Solve for X cord using line equatio'''
if slope != 0 and slope:
return float((y - float(yintercept))) / float(slope)
else:
raise Exception('Can not solve on a horizontal line')```

And we can do the reverse of above to verify they are both working, when X is equal to 5 our Y should be 3:

```>>> line.solve_for_x(5, m, b)
3.0```

## Put it all together

```class Line(object):

def __init__(self, data):
self.first, self.second = data

def slope(self):
'''Get the slope of a line segment'''
(x1, y1), (x2, y2) = self.first, self.second
try:
return (float(y2)-y1)/(float(x2)-x1)
except ZeroDivisionError:
# line is vertical
return None

def yintercept(self, slope):
'''Get the y intercept of a line segment'''
if slope != None:
x, y = self.first
return y - slope * x
else:
return None

def solve_for_y(self, x, slope, yintercept):
'''Solve for Y cord using line equation'''
if slope != None and yintercept != None:
return float(slope) * x + float(yintercept)
else:
raise Exception('Can not solve on a vertical line')

def solve_for_x(self, y, slope, yintercept):
'''Solve for X cord using line equatio'''
if slope != 0 and slope:
return float((y - float(yintercept))) / float(slope)
else:
raise Exception('Can not solve on a horizontal line')```

## DIY Living Room Bar

Material Used:

```Framing: 2x4
Bar Top: 1x12
Work Area Top: 3/4" Plywood
Foot Rest: 1x6, 1x4
Panel: Standard Siding
Below Counter space: 1x6
Wine Rack: 1x6, 1x4
Trim: Random Molding```

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