From Clausius theorem we get the formula for the change of entropy:
[tex]dS=\frac{dQ}{T}[/tex]
dS is the change of entropy, dQ is the change of energy, and T is the temperature in Kelvin.
We need to convert those temperatures:
[tex]T_{in}=22^\circ C= 273.15+22=295.15K\\ T_{out}=-17.5^\circ C=273.15-17.5=255.65K[/tex]
Entropy changes inside and outside:
[tex]$Inside$: dS= \frac{-dQ}{T_in}=\frac{-20\cdot 10^3}{295.15K}=-67.76\frac{J}{K} [/tex]
[tex]$Outside$: dS= \frac{+dQ}{T_out}=\frac{+20\cdot 10^3}{255.65K}=+78.23\frac{J}{K} [/tex]
The net entropy increase is:
[tex]dS=+78.23\frac{J}{K}-67.76\frac{J}{K}=+10.47\frac{J}{K} [/tex]
