I am trying to approximate the sine() function using a neural network I wrote myself. I have tested my neural network on a simple OCR problem already and it worked, but I am having trouble applying it to approximate sine(). My problem is that during training my error converges on exactly 50%, so I'm guessing it's completely random.

I am using one input neuron for the input (0 to PI), and one output neuron for the result. I have a single hidden layer in which I can vary the number of neurons but I'm currently trying around 6-10.

I have a feeling the problem is because I am using the sigmoid transfer function (which is a requirement in my application) which only outputs between 0 and 1, while the output for sine() is between -1 and 1. To try to correct this I tried multiplying the output by 2 and then subtracting 1, but this didn't fix the problem. I'm thinking I have to do some kind of conversion somewhere to make this work.

Any ideas?


4 Answers 4


Use a linear output unit.

Here is a simple example using R:

x <- sort(10*runif(50))
y <- sin(x) + 0.2*rnorm(x)

nn <- nnet(x, y, size=6, maxit=40, linout=TRUE)
plot(x, y)
plot(sin, 0, 10, add=TRUE)
x1 <- seq(0, 10, by=0.1)
lines(x1, predict(nn, data.frame(x=x1)), col="green")

neural net prediction

  • By linear output unit, do you mean calculating f(net) = net for the output unit? Because I've tried this and am still having the same problem.
    – MahlerFive
    Oct 14, 2009 at 9:36
  • Exactly, a linear function f(x)=a*x
    – rcs
    Oct 14, 2009 at 10:17
  • Minor detail, but your r-project.org hyperlink doesn't work without prepending "www." Oct 20, 2009 at 18:33
  • 1
    Why must we use linear output unit? I used sigmoid for both hidden layer and output layer and still got good results.
    – Sunny88
    May 14, 2012 at 15:14
  • The image link is broken. Can you upload it again? Dec 31, 2014 at 15:28

When you train the network, you should normalize the target (the sin function) to the range [0,1], then you can keep the sigmoid transfer function.

sin(x) in [-1,1]  =>  0.5*(sin(x)+1) in [0,1]

Train data:
    input    target    target_normalized
    0         0          0.5
    pi/4      0.70711    0.85355
    pi/2      1           1

Note that that we mapped the target before training. Once you train and simulate the network, you can map back the output of the net.

The following is a MATLAB code to illustrate:

%% input and target
input = linspace(0,4*pi,200);
target = sin(input) + 0.2*randn(size(input));

% mapping
[targetMinMax,mapping] = mapminmax(target,0,1);

%% create network (one hidden layer with 6 nodes)
net = newfit(input, targetMinMax, [6], {'tansig' 'tansig'});
net.trainParam.epochs = 50;

%% training
net = init(net);                            % init
[net,tr] = train(net, input, targetMinMax); % train
output = sim(net, input);                   % predict

%% view prediction
plot(input, mapminmax('reverse', output, mapping), 'r', 'linewidth',2), hold on
plot(input, target, 'o')
plot(input, sin(input), 'g')
hold off
legend({'predicted' 'target' 'sin()'})

network output


There is no reason your network shouldn't work, although 6 is definitely on the low side for approximating a sine wave. I'd try at least 10 maybe even 20.

If that doesn't work then I think you need to give more detail about your system. i.e. the learning algorithm (back-propagation?), the learning rate etc.


I get the same behavior if use vanilla gradient descent. Try using a different training algorithm.

As far as the Java applet is concerned, I did notice something interesting: it does converge if I use a "bipolar sigmoid" and I start with some non-random weights (such as results from a previous training using a Quadratic function).

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