I admit, not well versed in this particular subject and what not, but the surface level argument that comes up for this question is related to everything on/in Earth having angular momentum since it's formation. Essentially meaning it's inertia keeping things spinning (I believe). So, to go to your apple request, what is the mass of the apple, compared to Earth? Earth is listed at 5.972x10^24 kg. An apple is approximately 0.1 kg. I know this isn't very exact (an honestly I could be way off in this being related, so please correct me if so) but how long does the apple need to spin to simulate the time the Earth has spun at a relative time for it's mass difference?
The Earth has spun for 4.5 billion years, with a mass of 5.972e24
The apple needs to spin for x years with a mass of 0.1 kg.
4.5e8/x=5.972e24/0.1 (I'm like, 60% sure this is right, so please correct me if I'm wrong.)
4.5e8/x=5.972e25
4.5e8=5.972e25*x
4.5e8/5.972e25=x
x=7.535e-20 years. Or approx. a very very small amount of time.
Presuming this is even close to correct, that these things can even be compared like this (again, I'm a bit fuzzy on much of this, expounding on why I can't do this appreciated) and I didn't just butcher something with the math, if we want to discuss your apple we only have to make it spin for a period of time practically imperceptible to us. At least as far as the inherent inertia of the mass of the Earth is concerned. I think.
EDIT: Updated with correct Earth age. Note this only made the relative time period smaller