# How to keep fractions in your equation output

I've been using Python to calculate math equations. For example:

``````from sympy import Symbol, Derivative, Integral
x = Symbol('x')
d = Symbol('d')
Integral(8*x**(6/5)-7*x**(3/2),x).doit()
``````

Which results in the output:

``````3.63636363636364*x**2.2 - 2.8*x**2.5
``````

Is there a way to show this answer as fractions as opposed to decimals? I would like to see the output as:

``````(40/11)*x**(11/5)-(14/5)*x**(5/2)+C
``````

SymPy has Rational class for rational numbers.

``````from sympy import *
# other stuff
integrate(8*x**Rational(6, 5) - 7*x**Rational(3, 2),x)
``````

No need for `Integral().doit()` unless you actually want to print out the un-evaluated form.

Other versions:

``````integrate(8*x**Rational('6/5') - 7*x**Rational('3/2'),x)
``````

(rational number can be parsed from a string);

``````integrate(8*x**(S.One*6/5) - 7*x**(S.One*3/2),x)
``````

(beginning the computation with the SymPy object for "1" turns it into SymPy object manipulation, avoiding plain Python division, which would give a float)

• you shoud add the line `from sympy import S`. apart from that: nice, did not know! Aug 12 '17 at 14:12
• Actually add `from sympy import *` because the `integrate` function is needed as well. Aug 12 '17 at 14:27
• Any idea on how we would use Rational on non-division problems such as `integrate((x+1)*math.e**((7*x**2)+(14*x)))`? Aug 12 '17 at 18:21
• @d84_n1nj4 It's `integrate((x+1)*exp(7*x**2 + 14*x), x)` - use the exponential function, not `e**` But if you really want to, there is `E` in SymPy: `integrate((x+1)*E**(7*x**2 + 14*x), x)` works too. The general thing is, plain Python constants are floating point numbers, which is not what you want. You want the corresponding SymPy objects, obtainable from SymPy directly.
– user6655984
Aug 12 '17 at 18:44

you can work with the `fractions` module in order to have integral fractions:

``````from sympy import Symbol, Derivative, Integral
from fractions import Fraction
x = Symbol('x')
d = Symbol('d')
ii = Integral(8*x**Fraction(6,5)-7*x**Fraction(3,2),x).doit()
# 40*x**(11/5)/11 - 14*x**(5/2)/5
``````

there is also the `Rational` class in sympy itself:

``````from sympy import Symbol, Derivative, Integral, Rational
x = Symbol('x')
d = Symbol('d')
ii = Integral(8*x**Rational(6,5)-7*x**Rational(3,2),x).doit()
``````

Use sympy's `rational` instead of `6/5`. Python will immediately interpret `6/5` and return some floating point number (`1.2` in this case).

``````from sympy import Symbol, Derivative, Integral, Rational
x = Symbol('x')
d = Symbol('d')
Integral(8*x**(Rational(6,5))-7*x**(Rational(3,2)),x).doit()
``````