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Cell[TextData[{
  StyleBox["Lab  4B Parametrizing Surfaces",
    FontSize->24,
    FontWeight->"Bold",
    FontVariations->{"Underline"->True}],
  "\nMath 2374 - University of Minnesota\nhttp://www.math.umn.edu/math2374\n\
Questions to: rogness@math.umn.edu"
}], "Text",
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Cell[CellGroupData[{

Cell[TextData[StyleBox["Introduction",
  FontSize->14]], "Section",
  FontSize->12],

Cell[TextData[{
  "As in Lab 4A, there is no calculus in this notebook. In that lab you \
learned how to graph curves using ",
  StyleBox["ParametricPlot",
    FontWeight->"Bold"],
  " and ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  ".  You also had the chance to find the parametrizations for various \
curves.  This week we'll do the same thing with surfaces.\n\nWe haven't \
rigorously defined surfaces yet, but you probably have an intuitive idea of \
what a surface is.  It's like a piece of paper, or a sheet of rubber, but it \
doesn't have to be flat; it can be bent, curved, or even have holes in it.  \
Sometimes a surface encloses a solid region in space.  If so, we call it a ",
  StyleBox["closed",
    FontSlant->"Italic"],
  " surface.  The following pictures both show surfaces; the last one is a \
closed surface, while the first is not."
}], "Text"],

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Cell[CellGroupData[{

Cell[TextData[StyleBox["A First Look",
  FontSize->14]], "Section",
  FontSize->16],

Cell["\<\
Often our surfaces will be (a piece of) the graph of a function \
z=f(x,y), such as this example:\
\>", "Text"],

Cell[BoxData[{
    \(f[x_, y_] = x^2 + y^2\), "\[IndentingNewLine]", 
    \(Plot3D[f[x, y], {x, \(-1\), 1}, {y, \(-1\), 1}]\)}], "Input"],

Cell[TextData[{
  StyleBox["Mathematica",
    FontSlant->"Italic"],
  " can draw a great picture of graphs like this, but ",
  StyleBox["Plot3D",
    FontWeight->"Bold"],
  " has its limitations.  For example, what if we wanted to plot the graph of \
x = ",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  " + ",
  Cell[BoxData[
      \(TraditionalForm\`z\^2\)]],
  " ?  You should know by looking at this equation that this is a paraboloid, \
just like our picture above, except this one opens in the direction of the \
positive x-axis.  Suppose we tried to plot this with ",
  StyleBox["Plot3D",
    FontWeight->"Bold"],
  ":"
}], "Text"],

Cell[BoxData[
    \(Plot3D[y^2\  + \ z^2, \ {y, \(-1\), 1}, {z, \(-1\), 1}]\)], "Input"],

Cell[TextData[{
  "We get exactly the same picture as before!  The paraboloid opens upwards, \
which is incorrect.  The reason is that ",
  StyleBox["Plot3D",
    FontWeight->"Bold"],
  " expects a function of two variables, and it interprets the values of the \
function as the height.  Normally we give it a function of x and y, and since \
the z-axis represents height, this fits in to our view of the world.  \n\nHow \
can we get a true graph of x = ",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  " + ",
  Cell[BoxData[
      \(TraditionalForm\`z\^2\)]],
  " from ",
  StyleBox["Mathematica",
    FontSlant->"Italic"],
  "? Using parametric equations is one possibility.  Think back to last week \
when we did a \"trivial parametrization\" of the graph of y=g(x) by setting \
f(x) equal to (x, g(x)).  Define f(y,z)=(",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  " + ",
  Cell[BoxData[
      \(TraditionalForm\`z\^2\)]],
  ", y, z):"
}], "Text"],

Cell[BoxData[
    \(f[y_, z_] = {y^2\  + \ z^2, \ y, \ z}\)], "Input"],

Cell[TextData[{
  "Essentially we're saying that y and z are our parameters.  Now we can plot \
the graph of f using ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  ":"
}], "Text"],

Cell[BoxData[
    \(ParametricPlot3D[f[y, z], {y, \(-1\), 1}, {z, \(-1\), 1}, 
      AxesLabel \[Rule] {"\<x\>", "\<y\>", "\<z\>"}]\)], "Input"],

Cell[TextData[{
  "And you can see that this is a paraboloid opening in the direction of the \
positive x-axis, as desired.\n\nNote that we're using ",
  StyleBox["two",
    FontSlant->"Italic"],
  " parameters now, which is different than when we plotted curves.  This \
makes sense, if you think about it.  Curves are like a line, a \
one-dimensional object, so they require one parameter.  Surfaces are \
two-dimensional creatures, and so they require two parameters."
}], "Text"],

Cell[TextData[{
  "Note: if a ",
  StyleBox["curve",
    FontSlant->"Italic"],
  " is in the xy-plane, you can use ",
  StyleBox["ParametricPlot",
    FontWeight->"Bold"],
  ", or you can use ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  " by letting z(t)=0.  If you want to plot a surface, however, you ",
  StyleBox["must",
    FontSlant->"Italic"],
  " use ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  ".  The command ",
  StyleBox["ParametricPlot",
    FontWeight->"Bold"],
  " will not accept more than one parameter!  (So you can't give it ranges \
for, say, y ",
  StyleBox["and",
    FontSlant->"Italic"],
  " z.)\n\nAlso, most of this lab uses ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  ", so if you're using ",
  StyleBox["Mathematica",
    FontSlant->"Italic"],
  " version 4.x it would be a good idea to execute the command ",
  StyleBox["Off[ParametricPlot3D::ppcom]",
    FontWeight->"Bold"],
  " to get rid of those blue error messages about compiling functions.  \
People using ",
  StyleBox["Mathematica",
    FontSlant->"Italic"],
  " 5.0 needn't worry about this."
}], "Text",
  CellFrame->True,
  Background->GrayLevel[0.849989]]
}, Closed]],

Cell[CellGroupData[{

Cell[TextData[StyleBox["More Examples",
  FontSize->14]], "Section"],

Cell[TextData[{
  "Let's look at more examples of how to parametrize surfaces.  As in last \
week's lab, circular regions will be very important, and there is one \
technique in particular that you should learn.  Many of our surfaces will be \
relatively easy to describe using cylindrical coordinates (r,\[Theta],z), \
which have been covered in class.  A parametrization has to be in ",
  StyleBox["rectangular",
    FontSlant->"Italic"],
  " coordinates (x,y,z), so we can't just describe the surface in cylindrical \
coordinates and say we're done.  But if we've described the surface in \
cylindrical coordinates, we can use the following formulas to convert our \
description into rectangular coordinates:"
}], "Text"],

Cell["\<\
x = r Cos[\[Theta]]
y = r Sin[\[Theta]]
z = z\
\>", "Text",
  TextAlignment->Center,
  FontWeight->"Bold"],

Cell[TextData[{
  StyleBox["Example 1(a)",
    FontSize->14,
    FontWeight->"Bold"],
  StyleBox[".  Disks of Radius R in the Plane z=h\n",
    FontSize->14],
  "\nIn cylindrical coordinates, such a disk is described by (r,\[Theta],h) \
where 0\[LessEqual]r\[LessEqual] R, 0\[LessEqual]\[Theta]\[LessEqual]2\[Pi], \
and h is some constant number.  Converting to rectangular coordinates, we \
have: ",
  Cell[BoxData[
      \(TraditionalForm\`f(r, \[Theta]) = \((r\ Cos[\[Theta]], \ 
          r\ Sin[\[Theta]], \ h)\)\)]],
  ", where r and \[Theta] have the same bounds.  (r and \[Theta] are our \
parameters now.)  For example, if R=1 and h=0,"
}], "Text"],

Cell[BoxData[{
    \(f[r_, theta_] = {r*Cos[theta], \ r*Sin[theta], \ 
        0}\), "\[IndentingNewLine]", 
    \(disk0 = 
      ParametricPlot3D[f[r, theta], {r, 0, 1}, {theta, 0, 2  Pi}]\)}], "Input"],

Cell["Or, with other values of h:", "Text"],

Cell[BoxData[{
    \(disk1 = 
      ParametricPlot3D[{r*Cos[theta], r*Sin[theta], 1}, {r, 0, 1}, {theta, 0, 
          2  Pi}]\), "\[IndentingNewLine]", 
    \(disk2 = 
      ParametricPlot3D[{r*Cos[theta], r*Sin[theta], 2}, {r, 0, 1}, {theta, 0, 
          2  Pi}]\)}], "Input"],

Cell["Or, all together:", "Text"],

Cell[BoxData[{
    \(Show[disk0, \ disk1, \ disk2]\), "\[IndentingNewLine]", 
    \(ShowLive[%]\)}], "Input"],

Cell[TextData[{
  StyleBox["FYI",
    FontWeight->"Bold"],
  ": Normally when we use one parameter in this lab we'll choose the letter \
t.  When we use two parameters, the standard letters are s and t.  So often \
we would write these parametrizations as (for example):\n\nf(s,t) = (s\
\[CenterDot]Cos[t], s\[CenterDot]Sin[t], 0),\t\t0\[LessEqual]s\[LessEqual]1, \
0\[LessEqual]t\[LessEqual]2\[Pi].\n\nWhen we do a parametrization related to \
cylindrical coordinates, it might be more intuitive to use r (=radius) and t \
(=theta), but you're not required to do so.  You should also be aware that \
some textbooks use u and v as parameters instead of s and t (or r and t)."
}], "Text",
  CellFrame->True,
  Background->GrayLevel[0.849989]],

Cell[TextData[{
  StyleBox["Example 1(b)",
    FontSize->14,
    FontWeight->"Bold"],
  StyleBox[".  An Annulus\n",
    FontSize->14],
  "\nWe won't actually use this much, but it's an interesting example to \
point out.  Suppose we parametrize the disk of radius 4 in the plane z=1:"
}], "Text"],

Cell[BoxData[{
    \(f[s_, t_] = {s*Cos[t], \ s*Sin[t], \ 1}\), "\[IndentingNewLine]", 
    \(ParametricPlot3D[f[s, t], {s, 0, 4}, {t, 0, 2  Pi}]\)}], "Input"],

Cell["\<\
Now, instead of letting s range from 0 to 4, let's use values of s \
from 2 to 4 instead:\
\>", "Text"],

Cell[BoxData[
    \(ParametricPlot3D[f[s, t], {s, 2, 4}, {t, 0, 2  Pi}]\)], "Input"],

Cell[TextData[{
  "This type of surface is called an ",
  StyleBox["annulus",
    FontSlant->"Italic"],
  ".  More informally, we might refer to this surface as a \"washer,\" as in \
the little thing you can buy at the local hardware store."
}], "Text"],

Cell[TextData[{
  StyleBox["Example 2",
    FontSize->14,
    FontWeight->"Bold"],
  StyleBox[".  A Filled in Ellipse.\n",
    FontSize->14],
  "\nLast week we parametrized an ellipse:"
}], "Text"],

Cell[BoxData[
    \(ParametricPlot3D[{4  Cos[t], 3  Sin[t], 0}, {t, 0, 2  Pi}]\)], "Input"],

Cell["\<\
We can fill in the ellipse by introducing a second parameter, s.  \
Notice the similarity to the disk above!\
\>", "Text"],

Cell[BoxData[{
    \(f[s_, t_] = {4  s*Cos[t], \ 3  s*Sin[t], 0}\), "\[IndentingNewLine]", 
    \(ParametricPlot3D[f[s, t], {s, 0, 1}, {t, 0, 2  Pi}]\)}], "Input"],

Cell[TextData[{
  StyleBox["Example 3",
    FontSize->14,
    FontWeight->"Bold"],
  StyleBox[".  Shifted Circles and Ellipses.\n",
    FontSize->14],
  "\nAs with our circles last week, we can shift a circle so that it's \
centered at another point by adding the appropriate numbers to the components \
of the parametrization.  For example, here's a disk of radius 2 in the plane \
",
  Cell[BoxData[
      \(TraditionalForm\`z = 3\)]],
  " centered at (1.5,1):"
}], "Text"],

Cell[BoxData[{
    \(f[s_, t_] = {1.5\  + \ s*Cos[t], 1 + \ \ s*Sin[t], \ 
        3}\), "\[IndentingNewLine]", 
    \(ParametricPlot3D[f[s, t], {s, 0, 2}, {t, 0, 2  Pi}]\)}], "Input"],

Cell["\<\
It's also easy to graph a circle or ellipse in, say, the yz-plane \
instead of the xy-plane:\
\>", "Text"],

Cell[BoxData[{
    \(f[s_, t_] = {0, \ 4\  + \ 4  s*Cos[t], \ 
        2 + 2  s*Sin[t]}\), "\[IndentingNewLine]", 
    \(ParametricPlot3D[f[s, t], {s, 0, 1}, {t, 0, 2  Pi}]\)}], "Input"],

Cell["\<\
Use the following command to rotate the previous picture and see \
which plane the ellipse is in.\
\>", "Text"],

Cell[BoxData[
    \(ShowLive[%]\)], "Input"],

Cell[TextData[{
  StyleBox["Example 4",
    FontSize->14,
    FontWeight->"Bold"],
  StyleBox[".  A Piece of a Paraboloid\n",
    FontSize->14],
  "\nSuppose we want to work with the portion of the paraboloid z=",
  Cell[BoxData[
      \(TraditionalForm\`x\^2\)]],
  "+",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  " which is above the unit disk in the xy-plane.  We could try the \"trivial\
\" parametrization, \n\nf(x,y) = (x, y, ",
  Cell[BoxData[
      \(TraditionalForm\`x\^2\)]],
  "+",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  "), \t\twhere -1\[LessEqual]x\[LessEqual]1 and -",
  Cell[BoxData[
      FormBox[
        SqrtBox[
          RowBox[{"1", " ", "-", " ", 
            FormBox[\(x\^2\),
              "TraditionalForm"]}]], TraditionalForm]]],
  " \[LessEqual] y \[LessEqual] ",
  Cell[BoxData[
      FormBox[
        SqrtBox[
          RowBox[{"1", "-", 
            FormBox[\(x\^2\),
              "TraditionalForm"]}]], TraditionalForm]]]
}], "Text"],

Cell[TextData[{
  "The problem is that neither ",
  StyleBox["Plot3D",
    FontWeight->"Bold"],
  " or ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  " accept bounds like that for y.  Try it!  Both of these commands will \
produce errors:"
}], "Text"],

Cell[BoxData[
    \(Plot3D[
      x^2 + y^2, {x, \(-1\), 1}, {y, \(-Sqrt[1 - x^2]\), 
        Sqrt[1 - x^2]}]\)], "Input"],

Cell[BoxData[
    \(ParametricPlot3D[{x, y, x^2 + y^2}, {x, \(-1\), 
        1}, {y, \(-Sqrt[1 - x^2]\), Sqrt[1 - x^2]}]\)], "Input"],

Cell[TextData[{
  "We can solve this problem, though.  It turns out to be very easy to \
parametrize the surface if we describe it in cylindrical coordinates first.  \
Our x and y values are in the unit disk; this corresponds to 0\[LessEqual]r\
\[LessEqual]1 and 0\[LessEqual]\[Theta]\[LessEqual]2\[Pi].  All we need to do \
is describe  z=",
  Cell[BoxData[
      \(TraditionalForm\`x\^2\)]],
  "+",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  "in terms of r and \[Theta]; but we know that x=rCos[\[Theta]] and y=rSin[\
\[Theta]]!  On paper, square these and add them together; you should get z = \
",
  Cell[BoxData[
      \(TraditionalForm\`\(\(r\^2\)\(.\)\)\)]],
  "  So our parametrization is:"
}], "Text"],

Cell[BoxData[{
    \(f[r_, theta_] = {r\ Cos[theta], \ r\ Sin[theta], \ 
        r^2}\), "\[IndentingNewLine]", 
    \(ParametricPlot3D[f[r, theta], {r, 0, 1}, {theta, 0, 2  Pi}]\)}], "Input"],

Cell[TextData[{
  "Scroll up and compare this graph to the very first graph in this lab, \
which is of the very same paraboloid.  Notice how much nicer it looks when we \
use a circular domain and ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  " instead of ",
  StyleBox["Plot3D",
    FontWeight->"Bold"],
  " and the rectangle -1\[LessEqual]x\[LessEqual]1, -1\[LessEqual]y\
\[LessEqual]1."
}], "Text"],

Cell[TextData[{
  "FYI:  Sometimes this graph is called \"the portion of the paraboloid z=",
  Cell[BoxData[
      \(TraditionalForm\`x\^2\)]],
  "+",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  "which is above the unit disk.\"  Even more commonly we might call it \"the \
portion of the paraboloid z=",
  Cell[BoxData[
      \(TraditionalForm\`x\^2\)]],
  "+",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  " cut off by the cylinder ",
  Cell[BoxData[
      \(TraditionalForm\`x\^2\)]],
  "+",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  "= 1;\" it's really the same thing if you think about it.  If we draw the \
cylinder ",
  Cell[BoxData[
      \(TraditionalForm\`x\^2\)]],
  "+",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  "= 1 and only take the points of the paraboloid which are ",
  StyleBox["inside",
    FontSlant->"Italic"],
  " the cylinder, we get those points which, in cylindrical coordinates, have \
a radius between 0 and 1.  Those are precisely the points we used while \
creating this graph!"
}], "Text",
  CellFrame->True,
  Background->GrayLevel[0.849989]],

Cell[TextData[{
  StyleBox["Example 5",
    FontSize->14,
    FontWeight->"Bold"],
  StyleBox[".  A Cylinder\n",
    FontSize->14],
  "\nSo far nearly everything we've graphed has actually been a function of x \
and y -- for example, the circles were really just plots of z=0 (or z=1, z=2) \
where we happened to restrict our domain of x- and y- values to get a circle. \
 Here's an example which is ",
  StyleBox["not",
    FontSlant->"Italic"],
  " a function of x and y!  Let's graph the cylinder ",
  Cell[BoxData[
      \(TraditionalForm\`x\^2\)]],
  "+",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  "=9, 0\[LessEqual]z\[LessEqual]10.  You learned in an earlier lab that you \
can graph this cylinder with the following command.  If you don't remember \
for sure how ",
  StyleBox["ContourPlot3D",
    FontWeight->"Bold"],
  " works, you should look back at Lab 1B."
}], "Text"],

Cell[BoxData[
    \(ContourPlot3D[
      x^2\  + \ y^2\  - \ 9, \ {x, \(-6\), 6}, {y, \(-6\), 6}, {z, 0, 
        10}]\)], "Input"],

Cell[TextData[{
  "The problem with this approach is that we can see the cylinder, but we \
can't really work with it because we don't have a parametrization.  So let's \
find a way to plot it using ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  ".\n\nBecause we're graphing a cylinder, it's very natural to describe it \
in cylindrical coordinates.  With our earlier disks and other surfaces, r and \
\[Theta] varied while z stayed constant (or at least depended on r and \
\[Theta]).  So r and \[Theta] were our two parameters.  Now our situation is \
a little different.  In the cylinder ",
  Cell[BoxData[
      \(TraditionalForm\`x\^2\)]],
  "+",
  Cell[BoxData[
      \(TraditionalForm\`y\^2\)]],
  "=9, r is constantly equal to three, \[Theta] ranges from 0 to 2\[Pi], and \
z ranges from 0 to 5.  So now \[Theta] and z are our two parameters, and when \
we convert from cylindrical to rectangular coordinates we get:"
}], "Text"],

Cell[BoxData[{
    \(f[theta_, z_] = {3  Cos[theta], 3  Sin[theta], 
        z}\), "\[IndentingNewLine]", 
    \(ParametricPlot3D[
      f[theta, z], {theta, 0, 2  Pi}, {z, 0, 10}]\)}], "Input"],

Cell[TextData[{
  "Compare this to the plot from ",
  StyleBox["ContourPlot3D",
    FontWeight->"Bold"],
  " and decide which one you think looks better!\n\n",
  StyleBox[" Example 6",
    FontSize->14,
    FontWeight->"Bold"],
  StyleBox[".  A Helicoid.\n",
    FontSize->14],
  "\nHere's another example which is not a function of x and y.  Using the \
same sort of technique as with the circle and the ellipse -- multiplying x(t) \
and y(t) by a new parameter that ranges from 0 to 1 -- we can \"fill in\" the \
helix from last week's lab, producing sort of a spiral staircase.  (Well, at \
least a spiral ramp, anyway...)"
}], "Text"],

Cell[BoxData[{
    \(f[s_, t_] = {s*Cos[2  Pi\ t], \ s*Sin[2  Pi\ t], \ 
        t}\), "\[IndentingNewLine]", 
    \(ParametricPlot3D[f[s, t], {s, 0, 1}, {t, 0, 4}, 
      PlotPoints \[Rule] {15, 30}]\)}], "Input"],

Cell[TextData[{
  "This is somewhat choppy, but if we use the ",
  StyleBox["PlotPoints",
    FontWeight->"Bold"],
  " option with",
  " ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  ", we can make it look better:"
}], "Text"],

Cell[BoxData[{
    \(f[s_, t_] = {s\ Cos[2  Pi\ t], \ s\ Sin[2  Pi\ t], \ 
        t}\), "\[IndentingNewLine]", 
    \(ParametricPlot3D[f[s, t], {s, 0, 1}, {t, 0, 4}, 
      PlotPoints \[Rule] {15, 80}]\)}], "Input"],

Cell[TextData[{
  "A filled-in helix such as this is called a ",
  StyleBox["helicoid",
    FontSlant->"Italic"],
  "."
}], "Text"],

Cell[TextData[{
  StyleBox["FYI:",
    FontWeight->"Bold"],
  " Note that the ",
  StyleBox["PlotPoints",
    FontWeight->"Bold"],
  " option is used a little differently if we're plotting surfaces instead of \
curves.  Last week you learned that with just one parameter, ",
  StyleBox["PlotPoints",
    FontWeight->"Bold"],
  " tells ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  " how many different values of that one parameter to use.  When you have ",
  StyleBox["two",
    FontSlant->"Italic"],
  " parameters, however, you must tell ",
  StyleBox["ParametricPlot3D",
    FontWeight->"Bold"],
  " how many different values of ",
  StyleBox["each",
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same parametrization, and then flip-flop some of the components to get the \
right answer!\n\nYou should hand in your parametrization (including the \
bounds for your parameters!), a picture of the graph, and an explanation of \
how you arrived at your parametrization.  Stumbling across the correct graph \
without understanding why it works will result in very little credit.\n\n",
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intersection of the cylinder and the hyperboloid is a curve.  Find a \
parametrization for this curve.  (Your answer should NOT be the \
parametrization of a surface!)  \n\nHint: you did a problem similar to this \
in Exercise 3 in last week's lab.  Now that you've used cylindrical \
coordinates, here's an easy way to find the parametrization if you were \
confused by that problem: you can actually describe this curve in cylindrical \
coordinates. r will be constant, \[Theta] will change, and z will depend on \
\[Theta], so \[Theta] is your parameter.  Now express z in terms of \[Theta] \
(and the constant r) and change back to rectangular coordinates.\n\n(b)  Find \
a parametrization for the portion of the hyperboloid which is cut off by the \
cylinder.  In other words, fill in the part of the surface which is inside \
the curve you found in part (a).   (Suggestion: when you graph the surface, \
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",
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\n",
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