@Vib: more or less. The initial 400 degrees is pretty hefty.
I don't plan to do the experiment, but I can fantasize a little bit:
first choose my balls, e.g.
Indium, cp 0.24 kJ/(kg.K) , rho 7310 kg/m3 and
Steel with cp 0.49 kJ/(kg.K), rho 7850 kg/m3 ), then my target:
Paraffin, cp some 2.5 kJ/(kg.K), rho 900 kg/m3
this wax melts at, say 55 °C, heat of fusion a hefty 200 kJ/kg !
The 20 cm apart from the OP comes in handy for our shopping list:
Let's play safe and buy a lump of wax 60 x 40 x 15 cm3. Just about luggable.
Metal balls ? say 5 cm diameter. If we copy adjacent's formula mcΔt, cooling them from 400 to 55 degrees gives us some 40 and 87 kJ of energy in the form of heat (a ratio of 1:2 if you squint a bit).
For the paraffin, heating up a one-ball volume from 20 to 55 degrees costs only 5.2 kJ, but then also melting it another 11.8 kJ ! together 17 kJ.
The Indium ball can heat up and melt about 2.3 ball volumes and the steel ball 5.1 of them.
So (cylinder / sphere and the last bit is a half sphere) a depth of 1.7 and 3.5 ball diameters is my best guess. Ultimately, after the heat is evenly distributed, the 127 kJ heats up the whole block (mcΔt again) only 1.6 degrees, so there is no risk of a room-size paraffin splotch.
So far, I would bet on the steel ball coming through and the Indium getting stuck a little below half-way.
One thing I would ask your input on: behind the ball, the wax solidifies again, thus releasing 2/3 of the heat going from solid 20 to liquid 55 degrees. A nice fraction of that heat is passed on to the ball, so it may well go a significant factor deeper than I calculated. Who dares to bet the Indium ball makes it through ?
