Algebra and Trigonometry: Structure and Method, Book 2

2000th Edition

ISBN: 9780395977255

Author: MCDOUGAL LITTEL

Publisher: McDougal Littell

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Concept explainers

Vertices Of An Ellipse

In the study of the conic section of the geometry, An ellipse is a plane curve surrounding two focal points, or foci where the set of all locus of points in the plane has their sum of the distances to the two foci is constant. On the ellipse curve, it is…

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Question

Chapter 9.4, Problem 5E

To determine

To find: The ratio of the length of the major axis of this orbit to the length of the minor axis.

Expert Solution & Answer

Answer to Problem 5E

Therefore, the foci of ellipse is (0,6),(0,−6) .

Explanation of Solution

Given information:

The mean distance of the asteroid from the sun is 1.078 AU and the eccentricity of the orbit is 0.827 .

The given equation is,

3x2+y2=1.....(1) .

The equation of ellipse is,

x2a2+y2b2=1 .

Divide equation (1) by 9 .

x23+y29=1....(2) .

It can be rewritten as,

x2(3)2+y232=1 .

Now it is similar t the equation of ellipse. On comparing,

a=3b=3

Since the denominator of y2 is larger so the major axis is vertical.

Now, determine the x - intercept and y -intercept by replacing the y with 0 and x with 0 respectively.

The x -intercept is,

x232+032=1x2=(3)2x=3 .

The y -intercept is,

032+y232=1y2=32y=3

Equation (2) can be written as,

x23+y29=1y29=1−x23y2=93(3−x2)y=±3(3−x2)

It can be seen that |x| is a real number if and only if |y|≤3 .

Thus, The extent of the graph is limited to x - intercept 3 and −3 , and the y -intercept is 3 and −3 .

Now make the table of the points in the first quadrant as the graph is symmetric being the centre of the ellipse is (0,0) .

Algebra and Trigonometry: Structure and Method, Book 2, Chapter 9.4, Problem 5E , additional homework tip 1

The graph of ellipse is,

Algebra and Trigonometry: Structure and Method, Book 2, Chapter 9.4, Problem 5E , additional homework tip 2

Use the relationship,

c2=a2−b2 .

Here substitute a=3,b=3 .

c2=a2−b2=32−(3)29−3=6

On taking square root on both sides,

c2=6c=6

Therefore, the foci of ellipse is (0,6),(0,−6) .

Chapter 9.4, Problem 4E

Chapter 9.5, Problem 1OE

Chapter 9 Solutions

Algebra and Trigonometry: Structure and Method, Book 2

Ch. 9.1 - Prob. 1OE Ch. 9.1 - Prob. 2OE Ch. 9.1 - Prob. 3OE Ch. 9.1 - Prob. 4OE Ch. 9.1 - Prob. 5OE Ch. 9.1 - Prob. 6OE Ch. 9.1 - Prob. 7OE Ch. 9.1 - Prob. 8OE Ch. 9.1 - Prob. 9OE Ch. 9.1 - Prob. 10OE

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