Python | sympy.perfect_power() method
Last Updated :
05 Sep, 2019
With the help of sympy.perfect_power() method, we can find two integers b and e such that be is equal to the given number n.
Syntax:
perfect_power(n)
Parameter:
n – It denotes an integer.
Returns:
Returns a tuple of integers (b, e) such that be == n.
Example #1:
from sympy import perfect_power
n = 64
b, e = perfect_power(n)
print ( "n = {}" . format (n))
print ( "b = {} and e = {}." . format (b, e))
print ( "{}^{} == {}" . format (b, e, n))
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Output:
n = 64
b = 2 and e = 6.
2^6 == 64
Example #2:
from sympy import perfect_power
n = 64
b, e = perfect_power(n, big = False )
print ( "n = {}" . format (n))
print ( "b = {} and e = {}." . format (b, e))
print ( "{}^{} == {}" . format (b, e, n))
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Output:
n = 64
b = 8 and e = 2.
8^2 == 64
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