How can I write 1-e^(-value1^2/2*value2^2)
in Python?
I don't know how to use power operator and e
.
You can use exp(x)
function of math library, which is same as e^x
. Hence you may write your code as:
import math
x.append(1 - math.exp( -0.5 * (value1*value2)**2))
I have modified the equation by replacing 1/2
as 0.5
. Else for Python <2.7, we'll have to explicitly type cast the division value to float
because Python round of the result of division of two int
as integer. For example: 1/2
gives 0
in python 2.7 and below.
Just saying: numpy
has this too. So no need to import math
if you already did import numpy as np
:
>>> np.exp(1)
2.718281828459045
Python's power operator is **
and Euler's number is math.e
, so:
from math import e
x.append(1-e**(-value1**2/2*value2**2))
math.exp(stuff)
in preference to math.e**stuff
. It's likely to be both more accurate and faster.
Aug 26, 2016 at 12:15
Power is **
and e^
is math.exp
:
x.append(1 - math.exp(-0.5 * (value1*value2)**2))
math.e
or from math import e
(= 2.718281…)
The two expressions math.exp(x)
and e**x
are equivalent
however:
Return e raised to the power x, where e = 2.718281… is the base of natural logarithms. This is usually more accurate than math.e ** x
or pow(math.e, x)
. docs.python
for power use **
(3**2
= 9), not " ^ "
" ^ " is a bitwise XOR operator (& and, | or), it works logicaly with bits.
So for example 10^4
=14 (maybe unexpectedly) → consider the bitwise depiction:
(0000 1010 ^ 0000 0100 = 0000 1110) programiz
In my case, the exponent happens to be complex number with angle expressed in radians. So my approach was:
import cmath
theta = cmath.pi/4
output = cmath.exp(theta*1j) # LaTeX: $e^{i\theta}$
print(output) # (0.7071067811865476+0.7071067811865476j)
Note: Use 1j
instead of j
since python throws NameError
for j
. And used cmath
instead of math
.