Show that in the limit as c→∞ the behaviour of this network of sigmoid neurons is exactly the same as the network of perceptrons. How can this fail when w⋅x+b=0 for one of the perceptrons?
I'm able to show that c→∞ behaves the same as network of perceptrons. But I'm not sure if I'm correct on the reason why w⋅x+b=0 would fail.
By substituting z = 0 for the sigmoid function (1 / (1 + e^-z), I get 1 / (1 + e^-0) which breaks down to 1 / (1 + 1) = 1/2
If the definition that 1/2 would trigger a 1 in the neuron, then I don't see why w⋅x+b=0 would fail.