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Chapter 10: Problem 1

Fill in the blank. The equation \(r=2+\cos \theta\) represents a _____.

Short Answer

Expert verified
The equation \(r=2+\cos\theta\) represents a Cardioid

Step by step solution

01

Identify the Form

This task is concerned with recognizing the form in polar coordinates which the equation \(r=2+\cos\theta\) pertains to. In common types of polar equations, such equation occurs as a form of what is known as a Cardiod.
02

Verify

To confirm that it is a cardioid equation: In polar coordinates, a cardioid is represented by \(r=a+b\cos\theta\) or \(r=a+b\sin\theta\), depending on its orientation. Here, \(a = b = 1\), and it is in \(r=a+b\cos\theta\) form, which represents a cardioid.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Cardioid
A cardioid is a specific type of heart-shaped curve that is commonly encountered when dealing with polar equations. It is a member of the limaçon family, which can produce different shapes based on parameter values. A cardioid can be defined when the constants in its polar equation are equal, leading to a particular symmetry in its graph.

The standard forms for cardioid equations are either \( r = a + b\cos\theta \) or \( r = a + b\sin\theta \). The appearance of a cardioid is characterized by:
  • Having a single cusp (a point where the curve meets itself).
  • Being symmetric about the polar axis for the cosine form \( r = a + b\cos\theta \).
  • Being symmetric about the vertical line through the pole for the sine form \( r = a + b\sin\theta \).
Understanding cardioids and recognizing these features is crucial for identifying these types of graphs in polar coordinates.
Polar Equations
Polar equations are a type of mathematical equation used to describe curves on a plane using polar coordinates. Unlike traditional Cartesian coordinates, which use \(x\) and \(y\) to denote horizontal and vertical positions, polar coordinates use \(r\) (the radial distance from the origin) and \(\theta\) (the angle from the positive x-axis).

Polar equations are essential for representing curves that are more naturally suited to a radial layout, such as spirals and other symmetrical shapes:
  • The general form of a polar equation is \( r = f(\theta) \).
  • They allow for the easy representation of curves revolving around a central point.
  • Using polar coordinates can simplify calculations for curves that have rotational symmetry.
Familiarity with polar equations provides a powerful toolset for tackling complex graphing challenges encountered in mathematics, especially in calculus and physics.
Graphing in Polar Coordinates
Graphing in polar coordinates involves plotting points based on their radial distance from the origin and the angle from the positive x-axis. This approach is often more efficient for dealing with curves that are naturally interpreted in circular or radial contexts, such as circles, roses, and spirals.

To graph using polar coordinates:
  • Identify the radius \( r \) and the angle \( \theta \) for each point.
  • Plot points by measuring the angle \( \theta \) from the positive x-axis and then marking the point at the radial distance \( r \) from the origin.
  • Trace the graph by connecting these plotted points smoothly according to the equation.
Graphing in polar coordinates is particularly advantageous for visualizing shapes in fields like engineering and physics, where phenomena such as wave patterns and circular motion frequently appear.

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Most popular questions from this chapter

Use a graphing utility to graph the rotated conic. $$r=\frac{3}{1-\cos (\theta-\pi / 4)}$$

Find a polar equation of the conic with its focus at the pole. $$\begin{array}{cc} \text{Conic} & \text{Vertex or Vertices} \\\ \text{Parabola} &\left(1,-\frac{\pi}{2}\right)\end{array}$$

Identify the type of conic represented by the equation. Use a graphing utility to confirm your result. $$r=\frac{3}{-4-8 \cos \theta}$$

Describe the graph of the polar equation and find the corresponding rectangular equation. Sketch its graph. $$r=6$$

Find a polar equation of the conic with its focus at the pole. $$\begin{array}{cc} \text{Conic} & \text{Eccentricity} & \text{Directrix} \\\ \text{Parabola} &e=1&y=-4\end{array}$$
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