Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them; it only takes a minute:

enter image description here enter image description here

Suppose you have f(x)=x-floor(x).

enter image description here

By this, you can generate the grooves by gluing the top side and the bottom side together and then squeezing the left to zero -- now you have a conical helix: the line spins around the cone until it hits the bottom. You already have one form of the equations for the conical helix namely x=a*cos(a); y=a*sin(a); z=a. Now like here:

How can you project the conical helix on the cone in Matlab?

share|improve this question
I suppose you are looking for 1./( t .* sin(t) ) and not sin(t)./t? The way you wrote that expression, Matlab would interpret it as a latter one. – plesiv Jan 27 '13 at 23:18
@zplesivcak perhaps, I don't know yet -- I am trying to understand how to twist the surface of the cone first i.e. to add the fluctuation term. I like to think it only as a projection along the surface but then I need to find out somehow the normal vector of the surface in each point, thinking. Perhaps I think this too mathematically?! – hhh Jan 27 '13 at 23:21
1./( t .* sin(t) ) is really awful looking function with lots of poles, so I think that you need sin(t)./t ... – plesiv Jan 27 '13 at 23:27
if indeed zplesivcak is right, then you can also use sinc – bla Jan 28 '13 at 0:59

1 Answer 1

up vote 4 down vote accepted

I'd approach your problem without using plot3, instead I'd use meshgrid and sinc. Note that sinc is a matlab built in functions that just do sin(x)./x, for example:

enter image description here

So in 1-D, if I understand you correctly you want to "project" sinc(x) on sqrt(x.^2). The problem with your question is that you mention projection with the dot product, but a dot product reduces the dimensionality, so a dot product of two vectors gives a scalar, and of two 2D surfaces - a vector, so I don't understand what you mean. From the 2-D plot you added I interpreted the question as to "dress" one function with the other, like in addition...

Here's the implementation:

[x y]=meshgrid(linspace(-3*pi,3*pi,N),linspace(-3*pi,3*pi,N));

mesh(x,y,f) ;      axis vis3d

view(0,0) ;  axis square
colormap bone

enter image description here

The factor 2 in the sinc was placed for better visualization of the fluctuations of the sinc.

share|improve this answer
I cannot understand "t=sqrt(x.^2+y.^2);" -- does it have now greater fluctuation on the peak and smaller near the broad area? This "t=f=t+2*sinc(t).*t" makes it look oscillating the same along the surface -- perhaps now too large oscillation? I have to still study this to understand. I tried f=1./t+2*sinc(t) but getting far to large peak, testing... – hhh Jan 28 '13 at 6:42
t is just the radius, meaning z(x,y)=sqrt(x^2+y^2)=t will yield a cone. As for sinc, I'm not sure if that is the function you meant, but you can read about it in the documentation in the link, I've also added a plot of it in the answer. Why did you multiplied t*sinc in your comment? doing so you end up with the regular sin and not sinc... – bla Jan 28 '13 at 6:55
Missing the screw-shape (the hand-drawn picture), the pointy head and descending fluctuation from the broad area to top (top with the smallest amplitude) -- tried f=t+2*fliplr(sinc(t)) but not workingn -- still debugging, perhaps solving things myself but taking some time. – hhh Jan 28 '13 at 12:21
sinc is a symmetric function, fliplr won't change it. I think you need to first find the function that will do what you need, it see,s that sinc is not it. maybe you need something like f=t+exp(-t/a).*cos(b*t); – bla Jan 28 '13 at 17:07

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

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