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Ch.12 - Parametric and Polar Curves
Briggs - Calculus: Early Transcendentals 3rd Edition
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243Not the one you use?Change textbook
All textbooksBriggs 3rd EditionCh.12 - Parametric and Polar CurvesProblem 12.3.33
Chapter 12, Problem 12.3.33

33–40. Areas of regions Make a sketch of the region and its bounding curves. Find the area of the region.


The region inside the curve r = √(cos θ)

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1
First, understand the curve given in polar coordinates: \(r = \sqrt{\cos \theta}\). Since \(r\) must be real, identify the domain of \(\theta\) where \(\cos \theta \geq 0\). This will help determine the bounds for integration.
Sketch the curve by plotting points for values of \(\theta\) within the domain found. Note that \(r\) is non-negative and depends on \(\cos \theta\), which is positive in the intervals \([-\frac{\pi}{2}, \frac{\pi}{2}]\) and \([\frac{3\pi}{2}, \frac{5\pi}{2}]\), but since \(r\) is defined as \(\sqrt{\cos \theta}\), focus on the principal interval where \(r\) is real and positive.
Recall the formula for the area enclosed by a polar curve between angles \(\alpha\) and \(\beta\) is \(A = \frac{1}{2} \int_{\alpha}^{\beta} r^2 \, d\theta\). Substitute \(r^2 = \cos \theta\) into this formula.
Set up the integral for the area as \(A = \frac{1}{2} \int_{-\frac{\pi}{2}}^{\frac{\pi}{2}} \cos \theta \, d\theta\), using the interval where \(r\) is real and positive.
Evaluate the integral by integrating \(\cos \theta\) over the interval, then multiply by \(\frac{1}{2}\). This will give the area of the region inside the curve.

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Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Polar Coordinates and Curves

Polar coordinates represent points using a radius and an angle (r, θ). Curves defined in polar form, like r = √(cos θ), describe shapes based on these parameters. Understanding how to interpret and plot such curves is essential for visualizing the region whose area is to be found.
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Intro to Polar Coordinates

Area Calculation in Polar Coordinates

The area enclosed by a polar curve r(θ) from θ = a to θ = b is given by the integral (1/2) ∫[a to b] (r(θ))^2 dθ. This formula accounts for the sector-like slices of the region, making it crucial for finding areas bounded by polar curves.
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Intro to Polar Coordinates

Determining the Limits of Integration

To compute the area, one must identify the correct interval [a, b] for θ where the curve is defined and the region is enclosed. This often involves analyzing where r(θ) is real and non-negative, and where the curve completes a full loop or returns to the starting point.
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One-Sided Limits
Related Practice
Textbook Question

57–62. Polar equations for conic sections Graph the following conic sections, labeling the vertices, foci, directrices, and asymptotes (if they exist). Use a graphing utility to check your work.


r = 1/(2 - 2 sin θ)

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Textbook Question

39–50. Equations of ellipses and hyperbolas Find an equation of the following ellipses and hyperbolas, assuming the center is at the origin. 

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Textbook Question

What is the polar equation of the horizontal line y = 5?

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Textbook Question

15–30. Working with parametric equations Consider the following parametric equations.

a. Eliminate the parameter to obtain an equation in x and y.

b. Describe the curve and indicate the positive orientation.


x = r − 1, y = r³; −4 ≤ r ≤ 4

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Textbook Question

Tangent lines for a hyperbola Find an equation of the line tangent to the hyperbola x²/a² + y²/b² = 1 at the point (x₀, y₀)

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Textbook Question

Spiral arc length Consider the spiral r=4θ, for θ≥0.


a. Use a trigonometric substitution to find the length of the spiral, for 0≤θ≤√8.

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