I seem to be losing a lot of precision with floats.

For example I need to solve a matrix:

```
4.0x -2.0y 1.0z =11.0
1.0x +5.0y -3.0z =-6.0
2.0x +2.0y +5.0z =7.0
```

This is the code I use to import the matrix from a text file:

```
f = open('gauss.dat')
lines = f.readlines()
f.close()
j=0
for line in lines:
bits = string.split(line, ',')
s=[]
for i in range(len(bits)):
if (i!= len(bits)-1):
s.append(float(bits[i]))
#print s[i]
b.append(s)
y.append(float(bits[len(bits)-1]))
```

I need to solve using gauss-seidel so I need to rearrange the equations for x, y, and z:

```
x=(11+2y-1z)/4
y=(-6-x+3z)/5
z=(7-2x-2y)/7
```

Here is the code I use to rearrange the equations. `b`

is a matrix of coefficients and `y`

is the answer vector:

```
def equations(b,y):
i=0
eqn=[]
row=[]
while(i<len(b)):
j=0
row=[]
while(j<len(b)):
if(i==j):
row.append(y[i]/b[i][i])
else:
row.append(-b[i][j]/b[i][i])
j=j+1
eqn.append(row)
i=i+1
return eqn
```

However the answers I get back aren't precise to the decimal place.

For example, upon rearranging the second equation from above, I should get:

```
y=-1.2-.2x+.6z
```

What I get is:

```
y=-1.2-0.20000000000000001x+0.59999999999999998z
```

This might not seem like a big issue but when you raise the number to a very high power the error is quite large. Is there a way around this? I tried the `Decimal`

class but it does not work well with powers (i.e, `Decimal(x)**2`

).

Any ideas?