Sketch the region enclosed by the given curves. Decide whether to integrate with respect to x or y. Draw a typical approximating rectangle. x = 1 − y2, x = y2 − 1 The x y-coordinate plane is given. There are 2 curves, a shaded region, and an approximating rectangle on the graph. The first curve enters the window in the third quadrant, goes up and right becoming less steep, crosses the x-axis at approximately x = −0.71 crossing the second curve, changes direction at the point (0, 0.5), goes down and right becoming more steep, crosses the x-axis at approximately x = 0.71 crossing the second curve, and exits the window in the fourth quadrant. The second curve enters the window in the second quadrant, goes down and right becoming less steep, crosses the x-axis at approximately x = −0.71 crossing the first curve, changes direction at the point (0, −0.5), goes up and right becoming more steep, crosses the x-axis at approximately x = 0.71 crossing the first curve, and exits the window in the first quadrant. The region is below the first curve and above the second curve. The approximating rectangle occurs at x = 0.5, extends vertically from the second curve to the first curve, and has a width of Δx.
Sketch the region enclosed by the given curves. Decide whether to integrate with respect to x or y. Draw a typical approximating rectangle. x = 1 − y2, x = y2 − 1 The x y-coordinate plane is given. There are 2 curves, a shaded region, and an approximating rectangle on the graph. The first curve enters the window in the third quadrant, goes up and right becoming less steep, crosses the x-axis at approximately x = −0.71 crossing the second curve, changes direction at the point (0, 0.5), goes down and right becoming more steep, crosses the x-axis at approximately x = 0.71 crossing the second curve, and exits the window in the fourth quadrant. The second curve enters the window in the second quadrant, goes down and right becoming less steep, crosses the x-axis at approximately x = −0.71 crossing the first curve, changes direction at the point (0, −0.5), goes up and right becoming more steep, crosses the x-axis at approximately x = 0.71 crossing the first curve, and exits the window in the first quadrant. The region is below the first curve and above the second curve. The approximating rectangle occurs at x = 0.5, extends vertically from the second curve to the first curve, and has a width of Δx.
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter7: Analytic Trigonometry
Section7.6: The Inverse Trigonometric Functions
Problem 94E
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Sketch the region enclosed by the given curves. Decide whether to integrate with respect to x or y. Draw a typical approximating rectangle.
x = 1 − y2, x = y2 − 1
The x y-coordinate plane is given. There are 2 curves, a shaded region, and an approximating rectangle on the graph.
- The first curve enters the window in the third quadrant, goes up and right becoming less steep, crosses the x-axis at approximately x = −0.71 crossing the second curve, changes direction at the point (0, 0.5), goes down and right becoming more steep, crosses the x-axis at approximately x = 0.71 crossing the second curve, and exits the window in the fourth quadrant.
- The second curve enters the window in the second quadrant, goes down and right becoming less steep, crosses the x-axis at approximately x = −0.71 crossing the first curve, changes direction at the point (0, −0.5), goes up and right becoming more steep, crosses the x-axis at approximately x = 0.71 crossing the first curve, and exits the window in the first quadrant.
- The region is below the first curve and above the second curve.
- The approximating rectangle occurs at x = 0.5, extends vertically from the second curve to the first curve, and has a width of Δx.
The x y-coordinate plane is given. There are 2 curves, a shaded region, and an approximating rectangle on the graph.
- The first curve enters the window in the third quadrant, goes up and right becoming less steep, crosses the x-axis at x = −1 crossing the second curve, changes direction at the point (0, 1), goes down and right becoming more steep, crosses the x-axis at x = 1 crossing the second curve, and exits the window in the fourth quadrant.
- The second curve enters the window in the second quadrant, goes down and right becoming less steep, crosses the x-axis at x = −1 crossing the first curve, changes direction at the point (0, −1), goes up and right becoming more steep, crosses the x-axis at x = 1 crossing the first curve, and exits the window in the first quadrant.
- The region is below the first curve and above the second curve.
- The approximating rectangle occurs at x = 0.5, extends vertically from the second curve to the first curve, and has a width of Δx.
The x y-coordinate plane is given. There are 2 curves, a shaded region, and an approximating rectangle on the graph.
- The first curve enters the window in the third quadrant, goes up and right becoming more steep, crosses the y-axis at y = −1 crossing the second curve, changes direction at the point (1, 0), goes up and left becoming less steep, crosses the y-axis at y = 1 crossing the second curve, and exits the window in the second quadrant.
- The second curve enters the window in the fourth quadrant, goes up and left becoming more steep, crosses the y-axis at y = −1 crossing the first curve, changes direction at the point (−1, 0), goes up and right becoming less steep, crosses the y-axis at y = 1 crossing the first curve, and exits the window in the first quadrant.
- The region is left of the first curve and right of the second curve.
- The approximating rectangle occurs at y = 0.5, extends horizontally from the second curve to the first curve, and has a height of Δy.
The x y-coordinate plane is given. There are 2 curves, a shaded region, and an approximating rectangle on the graph.
- The first curve enters the window in the third quadrant, goes up and right becoming more steep, crosses the y-axis at approximately y = −0.71 crossing the second curve, changes direction at the point (0.5, 0), goes up and left becoming less steep, crosses the y-axis at approximately y = 0.71 crossing the second curve, and exits the window in the second quadrant.
- The second curve enters the window in the fourth quadrant, goes up and left becoming more steep, crosses the y-axis at approximately y = −0.71 crossing the first curve, changes direction at the point (−0.5, 0), goes up and right becoming less steep, crosses the y-axis at approximately y = 0.71 crossing the first curve, and exits the window in the first quadrant.
- The region is left of the first curve and right of the second curve.
- The approximating rectangle occurs at y = 0.5, extends horizontally from the second curve to the first curve, and has a height of Δy.
Find the area of the region.
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