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We looked at a circle in Chapter 1 and have a definition from a first course in
plane geometry. This is still the definition: A '''circle''' is the locus of points in a plane at a given distance from a fixed point. The given distance is called the '''radius''' and the fixed point is called the '''center'''.
If the center of the circle is at <math>(h, k)</math>, the distance from the center to a variable point <math>(x,y)</math> is, by the distance formula, <math>\sqrt{(x-h)^2 + (y-k)^2}</math>. If the radius is <math>r</math>, we have an equation of the circle given by
<span id{{=}}"eq3.1.1"/>
<math display="block">
\begin{equation}
\sqrt{(x-h)^2 + (y-k)^2} = r. 
\label{eq3.1.1}
\end{equation}
</math>
An equivalent equation which is more commonly used is
<span id{{=}}"eq3.1.2"/>
<math display="block">
\begin{equation}
(x-h)^2 + (y-k)^2 = r^2. 
\label{eq3.1.2}
\end{equation}
</math>
It is easy to see that, not only do all points at a distance <math>r</math> from <math>(h, k)</math> lie on the graph of (2), but also all points on the graph of (2) are at a distance r from <math>(h, k)</math>.
'''Example'''
(a) Write an equation of the circle with center at the origin and radius 3. (b)
Write an equation of the circle with center at <math>(-1, 2)</math> and radius 5.
<ul style="list-style-type:lower-alpha">
<li>
By the distance formula, the first circle has equation
<math display="block">
\sqrt{(x-0)^2 + (y-0)^2} = 3, \;\;\; \mbox{or} \;\;\;  x^2 + y^2 = 9.
</math>
</li>
<li>
By the distance formula, an equation for the second circle is\linebreak
<math>\sqrt{[x-(-1)]^2 + (y-2)^2} = 5</math>. Equivalent equations are
<math display="block">
\begin{eqnarray*}
(x + 1)^2 + (y - 2)^2 &=& 25, \\
x^2 + y^2 + 2x - 4y &=& 20.
\end{eqnarray*}
</math>
</li>
</ul>
As the following examples will show, any equation of the form <math>ax^2 + ay^2 + bx + cy + d = 0</math> is, loosely speaking, an equation of a circle. The words “loosely speaking” are inserted to cover possible degenerate cases. For example, if <math>a = 0</math> and <math>b</math> and <math>c</math> are not both zero, the equation becomes an equation of a line. In another degenerate case “the circle” may be just a point (if its radius is zero), and in another there may be no locus at all.
'''Example'''
Describe the graph of each of the following equations:
<ul style{{=}}"list-style-type:lower-alpha">
<li>
<math>x^2 + y^2 - 6x + 8y - 75 = 0</math>,
</li>
<li>
<math>x^2 + y^2 + 12x - 2y + 37 = 0</math>,
</li>
<li>
<math>x^2+y^2 - 4x- 5y+ 12 = 0</math>,
</li>
<li>
<math>3x^2 + 3y^2 - 9x + 10y - \frac{71}{12} = 0</math>.
</li>
</ul>
The technique of completing the square is useful in problems of this type. In (a), we write equations equivalent to the given equation until we recognize the form.
<math display="block">
\begin{eqnarray*}
              x^2 - 6x + y^2 + 8y &=& 75, \\
x^2 - 6x + 9 + y^2 + 8y + 16 &=& 75 + 9 + 16, \\
            (x - 3)^2 + (y + 4)^2 &=& 100.
\end{eqnarray*}
</math>
The graph is a circle with center at <math>(3, - 4)</math> and radius 10.
Applying the same technique to (b), we have
<math display="block">
\begin{eqnarray*}
            x^2 + 12x + y^2 - 2y &=& -37, \\
x^2 + 12x + 36 + y^2 - 2y + 1 &=& -37 + 36 + 1, \\
              (x + 6)^2 + (y - 1)^2 &=& 0.
\end{eqnarray*}
</math>
The graph is a circle with center at <math>(- 6, 1)</math> and radius 0; i.e., it is just the point <math>(- 6, 1)</math>. We may say that the graph consists of the single point, although we sometimes describe it as a point circle.
The equation of (c) gives different results:
<math display="block">
\begin{eqnarray*}
                          x^2 - 4x + y^2 - 5y &=& - 12, \\
x^2 - 4x + 4 + y^2 - 5y + \frac{25}{4} &=& - 12 + 4 + \frac{25}{4}, \\
              (x-2)^2 + (y - \frac{5}{2})^2 &=& -\frac{7}{4}.
\end{eqnarray*}
</math>
For any two real numbers <math>x</math> and <math>y</math>, the numbers <math>(x-2)^2</math> and <math>(y-\frac{5}{2})^2</math> must both be nonnegative, while <math>-\frac{4}{7}</math> is certainly negative. Hence there are no points in the plane satisfying this equation. However, the form of the last of the three equivalent equations is that of the equation of a circle, and we sometimes say that the graph is an imaginary circle with center at <math>(2, \frac{5}{2})</math> and radius <math>\frac{1}{2}\sqrt{-7}</math>.
Equation (d) requires a bit more manipulation:
<math display="block">
\begin{eqnarray*}
                                                3x^2 - 9x + 3y^2 + 10y &=& \frac{71}{12},\\
                                        x^2 - 3x + y^2 + \frac{10}{3}y &=& \frac{71}{36},\\
x^2 - 3x + \frac{9}{4} + y^2 + \frac{10}{3}y + \frac{29}{5} &=& \frac{71}{36} + \frac{9}{4} + \frac{25}{9}, \\
                            (x - \frac{3}{2})^2 + (y + \frac{5}{3})^2 &=& 7.
\end{eqnarray*}
</math>
The graph is a circle with center at <math>(\frac{3}{2}, -\frac{5}{3})</math> and radius <math>\sqrt7</math>.
By completing the square, as in the above examples, one can show that any equation of the form
<math display="block">
ax^2 + ay^2 + bx + cy + d = 0
</math>
is an equation of a circle of positive radius if and only if <math>a \neq 0</math> and <math>b^2 + c^2  >  4ad</math>.
The circle is also the intersection of a right circular cone with a plane perpendicular to the axis of the cone. If the plane passes through the vertex of the cone, the intersection is a point.
We can use the techniques of the calculus, as well as our knowledge of Euclidean geometry, to write an equation for a circle or for a line tangent to a circle, from given geometric conditions.
'''Example'''
Write an equation of the line which is tangent to the graph of <math>(x + 3)^2 + (y - 4)^2
= 25</math> at (1, 7). We may find the slope by use of the derivative, differentiating implicitly and remembering that one interpretation of the derivative is the slope of the tangent: <math>2(x + 3) + 2(y - 4)y' = 0</math>; hence <math>y' = - \frac{x + 3}{y - 4}</math>. The slope Or the tangent is <math>-\frac{1 + 3}{7 - 4} = - \frac{4}{3}</math>. We
may also find the slope of the tangent by noting first that the radius to (1, 7) has slope <math>\frac{7-4}{1- (-3)}= \frac{3}{4}</math> and then by remembering that the tangent is perpendicular to the radius and hence has slope <math>-\frac{4}{3}</math>. Thus the tangent line has equation <math>y-7 = - \frac{4}{3}(x-1)</math> or <math>4x + 3y = 25</math>.
==General references==
{{cite web |title=Crowell and Slesnick’s Calculus with Analytic Geometry|url=https://math.dartmouth.edu/~doyle/docs/calc/calc.pdf |last=Doyle |first=Peter G.|date=2008 |access-date=Oct 29, 2024}}

Latest revision as of 19:01, 5 November 2024

[math] \newcommand{\ex}[1]{\item } \newcommand{\sx}{\item} \newcommand{\x}{\sx} \newcommand{\sxlab}[1]{} \newcommand{\xlab}{\sxlab} \newcommand{\prov}[1] {\quad #1} \newcommand{\provx}[1] {\quad \mbox{#1}} \newcommand{\intext}[1]{\quad \mbox{#1} \quad} \newcommand{\R}{\mathrm{\bf R}} \newcommand{\Q}{\mathrm{\bf Q}} \newcommand{\Z}{\mathrm{\bf Z}} \newcommand{\C}{\mathrm{\bf C}} \newcommand{\dt}{\textbf} \newcommand{\goesto}{\rightarrow} \newcommand{\ddxof}[1]{\frac{d #1}{d x}} \newcommand{\ddx}{\frac{d}{dx}} \newcommand{\ddt}{\frac{d}{dt}} \newcommand{\dydx}{\ddxof y} \newcommand{\nxder}[3]{\frac{d^{#1}{#2}}{d{#3}^{#1}}} \newcommand{\deriv}[2]{\frac{d^{#1}{#2}}{dx^{#1}}} \newcommand{\dist}{\mathrm{distance}} \newcommand{\arccot}{\mathrm{arccot\:}} \newcommand{\arccsc}{\mathrm{arccsc\:}} \newcommand{\arcsec}{\mathrm{arcsec\:}} \newcommand{\arctanh}{\mathrm{arctanh\:}} \newcommand{\arcsinh}{\mathrm{arcsinh\:}} \newcommand{\arccosh}{\mathrm{arccosh\:}} \newcommand{\sech}{\mathrm{sech\:}} \newcommand{\csch}{\mathrm{csch\:}} \newcommand{\conj}[1]{\overline{#1}} \newcommand{\mathds}{\mathbb} [/math]

We looked at a circle in Chapter 1 and have a definition from a first course in plane geometry. This is still the definition: A circle is the locus of points in a plane at a given distance from a fixed point. The given distance is called the radius and the fixed point is called the center. If the center of the circle is at [math](h, k)[/math], the distance from the center to a variable point [math](x,y)[/math] is, by the distance formula, [math]\sqrt{(x-h)^2 + (y-k)^2}[/math]. If the radius is [math]r[/math], we have an equation of the circle given by

[[math]] \begin{equation} \sqrt{(x-h)^2 + (y-k)^2} = r. \label{eq3.1.1} \end{equation} [[/math]]

An equivalent equation which is more commonly used is

[[math]] \begin{equation} (x-h)^2 + (y-k)^2 = r^2. \label{eq3.1.2} \end{equation} [[/math]]

It is easy to see that, not only do all points at a distance [math]r[/math] from [math](h, k)[/math] lie on the graph of (2), but also all points on the graph of (2) are at a distance r from [math](h, k)[/math].

Example

(a) Write an equation of the circle with center at the origin and radius 3. (b) Write an equation of the circle with center at [math](-1, 2)[/math] and radius 5.

  • By the distance formula, the first circle has equation
    [[math]] \sqrt{(x-0)^2 + (y-0)^2} = 3, \;\;\; \mbox{or} \;\;\; x^2 + y^2 = 9. [[/math]]
  • By the distance formula, an equation for the second circle is\linebreak [math]\sqrt{[x-(-1)]^2 + (y-2)^2} = 5[/math]. Equivalent equations are
    [[math]] \begin{eqnarray*} (x + 1)^2 + (y - 2)^2 &=& 25, \\ x^2 + y^2 + 2x - 4y &=& 20. \end{eqnarray*} [[/math]]

As the following examples will show, any equation of the form [math]ax^2 + ay^2 + bx + cy + d = 0[/math] is, loosely speaking, an equation of a circle. The words “loosely speaking” are inserted to cover possible degenerate cases. For example, if [math]a = 0[/math] and [math]b[/math] and [math]c[/math] are not both zero, the equation becomes an equation of a line. In another degenerate case “the circle” may be just a point (if its radius is zero), and in another there may be no locus at all.

Example

Describe the graph of each of the following equations:

  • [math]x^2 + y^2 - 6x + 8y - 75 = 0[/math],
  • [math]x^2 + y^2 + 12x - 2y + 37 = 0[/math],
  • [math]x^2+y^2 - 4x- 5y+ 12 = 0[/math],
  • [math]3x^2 + 3y^2 - 9x + 10y - \frac{71}{12} = 0[/math].

The technique of completing the square is useful in problems of this type. In (a), we write equations equivalent to the given equation until we recognize the form.

[[math]] \begin{eqnarray*} x^2 - 6x + y^2 + 8y &=& 75, \\ x^2 - 6x + 9 + y^2 + 8y + 16 &=& 75 + 9 + 16, \\ (x - 3)^2 + (y + 4)^2 &=& 100. \end{eqnarray*} [[/math]]

The graph is a circle with center at [math](3, - 4)[/math] and radius 10. Applying the same technique to (b), we have

[[math]] \begin{eqnarray*} x^2 + 12x + y^2 - 2y &=& -37, \\ x^2 + 12x + 36 + y^2 - 2y + 1 &=& -37 + 36 + 1, \\ (x + 6)^2 + (y - 1)^2 &=& 0. \end{eqnarray*} [[/math]]

The graph is a circle with center at [math](- 6, 1)[/math] and radius 0; i.e., it is just the point [math](- 6, 1)[/math]. We may say that the graph consists of the single point, although we sometimes describe it as a point circle. The equation of (c) gives different results:

[[math]] \begin{eqnarray*} x^2 - 4x + y^2 - 5y &=& - 12, \\ x^2 - 4x + 4 + y^2 - 5y + \frac{25}{4} &=& - 12 + 4 + \frac{25}{4}, \\ (x-2)^2 + (y - \frac{5}{2})^2 &=& -\frac{7}{4}. \end{eqnarray*} [[/math]]


For any two real numbers [math]x[/math] and [math]y[/math], the numbers [math](x-2)^2[/math] and [math](y-\frac{5}{2})^2[/math] must both be nonnegative, while [math]-\frac{4}{7}[/math] is certainly negative. Hence there are no points in the plane satisfying this equation. However, the form of the last of the three equivalent equations is that of the equation of a circle, and we sometimes say that the graph is an imaginary circle with center at [math](2, \frac{5}{2})[/math] and radius [math]\frac{1}{2}\sqrt{-7}[/math]. Equation (d) requires a bit more manipulation:

[[math]] \begin{eqnarray*} 3x^2 - 9x + 3y^2 + 10y &=& \frac{71}{12},\\ x^2 - 3x + y^2 + \frac{10}{3}y &=& \frac{71}{36},\\ x^2 - 3x + \frac{9}{4} + y^2 + \frac{10}{3}y + \frac{29}{5} &=& \frac{71}{36} + \frac{9}{4} + \frac{25}{9}, \\ (x - \frac{3}{2})^2 + (y + \frac{5}{3})^2 &=& 7. \end{eqnarray*} [[/math]]

The graph is a circle with center at [math](\frac{3}{2}, -\frac{5}{3})[/math] and radius [math]\sqrt7[/math].

By completing the square, as in the above examples, one can show that any equation of the form

[[math]] ax^2 + ay^2 + bx + cy + d = 0 [[/math]]

is an equation of a circle of positive radius if and only if [math]a \neq 0[/math] and [math]b^2 + c^2 \gt 4ad[/math]. The circle is also the intersection of a right circular cone with a plane perpendicular to the axis of the cone. If the plane passes through the vertex of the cone, the intersection is a point. We can use the techniques of the calculus, as well as our knowledge of Euclidean geometry, to write an equation for a circle or for a line tangent to a circle, from given geometric conditions.

Example

Write an equation of the line which is tangent to the graph of [math](x + 3)^2 + (y - 4)^2 = 25[/math] at (1, 7). We may find the slope by use of the derivative, differentiating implicitly and remembering that one interpretation of the derivative is the slope of the tangent: [math]2(x + 3) + 2(y - 4)y' = 0[/math]; hence [math]y' = - \frac{x + 3}{y - 4}[/math]. The slope Or the tangent is [math]-\frac{1 + 3}{7 - 4} = - \frac{4}{3}[/math]. We may also find the slope of the tangent by noting first that the radius to (1, 7) has slope [math]\frac{7-4}{1- (-3)}= \frac{3}{4}[/math] and then by remembering that the tangent is perpendicular to the radius and hence has slope [math]-\frac{4}{3}[/math]. Thus the tangent line has equation [math]y-7 = - \frac{4}{3}(x-1)[/math] or [math]4x + 3y = 25[/math].

General references

Doyle, Peter G. (2008). "Crowell and Slesnick's Calculus with Analytic Geometry" (PDF). Retrieved Oct 29, 2024.

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