What Are the Level Surfaces of the Function f(x,y,z) = (x-2)² + y² + z²?

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Homework Statement





Homework Equations



f(x,y,z,)=(x-2)2+y2+z2

The Attempt at a Solution

 
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Welcome to PF!

Hi M.Qayyum! Welcome to PF! :smile:

I assume you want the surfaces with f(x,y,z) = constant?

Hint: that looks pretty much like a sphere, doesn't it? :wink:
 
First of all thanks for welcome...
and thanks for your time...But i want to know, how to solve these questions, please explain little more.
(New to Calculus-Sorry for my Bad English)
 
M.Qayyum said:
First of all thanks for welcome...
and thanks for your time...But i want to know, how to solve these questions, please explain little more.
(New to Calculus-Sorry for my Bad English)

What is the problem statement? You can't be just given an equation and asked to solve it. Your question is too ambiguous.
 
In order to solve a problem, you have to have a problem! So far, you just have function! What is the problem? If it is "describe the level surfaces" of a given function, set the function equal to a constant and try to determine what the graph of that equation looks like.

f(x,y,z)= c is one equation in three variables, x, y, and z. Given values for two of those, you could (theoretically) solve for the third. So the figure is a two dimensional figure- a surface. The term "level surface" comes from the lower dimensional case: the graph of z= f(x,y) is itself a surface. If we look at f(x,y)= c, we get a one-dimensional graph, the "level curve" since every point is at the "z= c" level of the original graph.
 
HallsofIvy said:
In order to solve a problem, you have to have a problem! So far, you just have function! What is the problem? If it is "describe the level surfaces" of a given function, set the function equal to a constant and try to determine what the graph of that equation looks like.

f(x,y,z)= c is one equation in three variables, x, y, and z. Given values for two of those, you could (theoretically) solve for the third. So the figure is a two dimensional figure- a surface. The term "level surface" comes from the lower dimensional case: the graph of z= f(x,y) is itself a surface. If we look at f(x,y)= c, we get a one-dimensional graph, the "level curve" since every point is at the "z= c" level of the original graph.

Thanks for your help,that's what i was looking for...
(New to Calculus-Sorry For my Bad English)
 
Your English is very good- in fact, excellent compared to my (put pretty much any language here)!
 
it's 7 A.M in Pakistan...(Sorry for my Timing as well...ha ha ha)
 

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