Consider the polynomial $$ x^3 - 21 x^2 + 120 x - 100 = 0 $$ The roots are 1, 10, 10.
from sympy import N, roots
from sympy import Integer as Int
r= roots([1,-21,120,-100])
for x in r:
print x
1 10
Perturb the coefficient of $x^3$ $$ \frac{99}{100}x^3 - 21 x^2 + 120 x - 100 = 0 $$
r= roots([Int(99)/100,-21,120,-100])
for x in r:
print N(x)
1.0001235059284 + 0.e-20*I 9.0412990764462 + 0.e-20*I 11.1706986297466 + 0.e-20*I
The double roots are very sensitive. Now perturb the coefficient in the other direction $$ \frac{101}{100}x^3 - 21 x^2 + 120 x - 100 = 0 $$
r= roots([Int(101)/100,-21,120,-100])
for x in r:
print N(x)
9.89610130781283 + 1.04369535224477*I 9.89610130781283 - 1.04369535224477*I 0.999876592295142
The double roots become complex, again showing they are very sensitive to the coefficient of $x^3$.