# Parabolic equation producing odd results

I have looked on the forums for help with this but to tell you the truth I have no idea what to search for and I have no error to go by so here goes. I am trying to plot a parabola. I have plot it in excel already so I know what it should look like. However when I plot it in Python using Matplotlib, instead of the smooth curve I expect to get, I get a jagged edge. I have zoomed in and solved for specific values of x and found the python solution to be incorrect. I have copied my code below and will include an example of a calculation.

``````  thacker_curved_final__author__="ahe"
__date__ ="\$20-Aug-2014\$"

import numpy as np
import matplotlib.pyplot as plt
import math
import sys
from math import sqrt
import decimal

n=5
t=0
l=100000.0
h0=100
g=9.81
l2=l**2.0

nx, ny = (1001,1001)
x5 = np.linspace(-100000,100000,nx)
y5 = np.linspace(-100000,100000,ny)
xv,yv = np.meshgrid(x5,y5)
x = np.arange(-100000,100200,200)
y = np.arange(-100000,100200,200)
t59=np.arange (1,1002002,1)

# Building the parabolic basin (Bottom)
zf=np.arange(len(x))
for i in range (len(x)):
zf[i]=((1.0*(10.0**-8.0))*(x[i]**2.0))-100

plt.figure(1)
plt.plot(x,zf)
plt.show()
``````

Example: Take x to be 200. Substituting that into the equation:

``````Zf = (1*10^-8(x^2))-100
``````

I get that `Zf = -99.9996`, however in the plot Zf is equal to `-99.0`.

As I said I have no idea what is the cause of this (fairly new to Python) so any help would be appreciated.

-
By the way, you usually don't need loops with numpy. Something like this should work: `zf = (x ** 2.0) / (10 ** 8) - 100` –  grc Aug 21 '14 at 11:02

## 1 Answer

`np.arange` builds an array of `dtype('int32')`, so any numbers put into that array will be truncated. Instead, specify that the array should hold floating point numbers:

``````zf = np.arange(len(x), dtype=np.float_)
``````

For example:

``````>>> a = np.arange(2)
>>> a[1] = 0.8
>>> a
array([0, 0])
>>> a = np.arange(2, dtype=np.float_)
>>> a[1] = 0.8
>>> a
array([ 0. ,  0.8])
``````
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Thank you, a minimal fix will do just fine for now. I am just doing some experimenting. Thanks for your help. –  user3771983 Aug 21 '14 at 10:58