Classify the surface problem?

[Guest]

Hi
I'm having trouble with the consistency on how to classify surfaces.

Here is the problem:
The equation p^2cos(2phi) = 1 is the equation of a quadratic surface expressed in spherical coordinates. Write this equation in rectangular coordinates and classify the surface.

Here are all the different equations to use:
x=psin(phi)cos(theta); y = psin(phi)sin(theta); z = pcos(phi)
p^2 = x^2 + y^2 + z^2

Thanks for any help you can give me on this.

Take care,
Beckie

 

[Guest]

anyone?

 

[rahidz2003]

p^2(cos(2phi))=1...

To classify it, I'd put it into terms of x,y, and z first, since they're more familiar to deal with.

Well, I'd start off with using the double-angle formula for cosine :
cos(2x)=(cosx)^2-(sinx)^2

Applying that, and distributing the p^2, we get
p^2(cos(phi))^2 - p^2(sin(phi))^2 = 1

(p cos(phi))^2 - (p sin(phi))^2 = 1

p cos(phi) = z
p sin(phi) = r

So we've got

z^2-r^2=1

r^2=x^2+y^2

So, the final equation is z^2-x^2-y^2=1.

which is in the form -(x^2/a^2)-(y^2/b^2)+(z^2/c^2)=1, which corresponds to a hyperboloid of two sheets.

 

[Guest]

Thank you thank you!!! Is there a way to plot points of these equations so I can graph it? I need to have a visual of how this works.

Thanks so much
Take care,
Beckie

 

[Gene]

I'd have to do research to verify what-is-it.
3-D plotting is a chalange. You can assign values to z then plot the 2-D xy curves "in the air" then connect the z points. You might be interested in:
http://www.math.umn.edu/~rogness/quadrics/hyper2.shtml
and
http://math.bu.edu/INDIVIDUAL/paul/225/ ... ass10.html