I am going through Chapter 1 of neuralnetworksanddeeplearning and didn't understand the second exercise (Sigmoid neurons simulating perceptrons, part II)

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.

2 Answers 2


You have more or less already answered your question. The transfer function of a perceptron is the step function H(z) which is zero for z<0 and 1 otherwise. The sigmoidal function S(c*z) for large c is is equivalent to the step function except at z=0 where H(z)=1 and S(c*z) = 0.5.

  • 1
    Hey Thomas! Thanks for getting back! But I don't understand "How can this fail when w⋅x+b=0 for one of the perceptrons?" I understand sigmoid function will output 1/2 but how does this fail? Nov 13, 2015 at 0:33
  • 2
    It fails to be "exactly the same as the network of perceptrons". This means that the output of a network with sigmoidal units would differ if the argument of the transfer function is zero for at least one unit.
    – thomas
    Nov 13, 2015 at 15:28

graph of Sigmoid Function image source: Towards Data Science

As you can see in the above graph it is clear that for values < -5 and values > 5 the sigmoid function outputs a value close to 0 or 1 respectively. Here 5 is just used for representation but in reality this means that for extreme values of z the sigmoid function either outputs 0 or 1.

Therefore in your case, when you multiply the equation (w.x + b) with positive number c where c→∞ the value of z = c.(w.x + b) ~ -∞ (for w.x + b < 0) and z = c.(w.x + b) ~ ∞ (for w.x + b > 0). So, in these two cases you can expect a value close to 0 or 1. But when w.x + b = 0, z = 0 and sigmoid function outputs 0.5 or 1/2 which is not characteristic of a perceptron, which is described as "failing to mimic the behaviour of perceptron" in your question.

  • what is the behaviour of perceptron that you're talking about? May 5, 2022 at 23:17

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge that you have read and understand our privacy policy and code of conduct.

Not the answer you're looking for? Browse other questions tagged or ask your own question.