12.4 Rotation of axes (Page 2/8)

<< Chapter < Page

Algebra and trigonometry

Page 2 / 8

Chapter >> Page >

Identifying a conic from its general form

Identify the graph of each of the following nondegenerate conic sections.

$4 x^{2} - 9 y^{2} + 36 x + 36 y - 125 = 0$
$9 y^{2} + 16 x + 36 y - 10 = 0$
$3 x^{2} + 3 y^{2} - 2 x - 6 y - 4 = 0$
$- 25 x^{2} - 4 y^{2} + 100 x + 16 y + 20 = 0$

Rewriting the general form, we have
$A = 4$ and $C = −9,$ so we observe that $A$ and $C$ have opposite signs. The graph of this equation is a hyperbola.
Rewriting the general form, we have
$A = 0$ and $C = 9.$ We can determine that the equation is a parabola, since $A$ is zero.
Rewriting the general form, we have
$A = 3$ and $C = 3.$ Because $A = C,$ the graph of this equation is a circle.
Rewriting the general form, we have
$A = −25$ and $C = −4.$ Because $A C > 0$ and $A \neq C,$ the graph of this equation is an ellipse.

Got questions? Get instant answers now!

Try It

Identify the graph of each of the following nondegenerate conic sections.

$16 y^{2} - x^{2} + x - 4 y - 9 = 0$
$16 x^{2} + 4 y^{2} + 16 x + 49 y - 81 = 0$

hyperbola
ellipse

Got questions? Get instant answers now!

Finding a new representation of the given equation after rotating through a given angle

Until now, we have looked at equations of conic sections without an $x y$ term, which aligns the graphs with the x - and y -axes. When we add an $x y$ term, we are rotating the conic about the origin. If the x - and y -axes are rotated through an angle, say $θ,$ then every point on the plane may be thought of as having two representations: $(x, y)$ on the Cartesian plane with the original x -axis and y -axis, and $(x^{'}, y^{'})$ on the new plane defined by the new, rotated axes, called the x' -axis and y' -axis. See [link] .

The graph of the rotated ellipse $x^{2} + y^{2} - x y - 15 = 0$

We will find the relationships between $x$ and $y$ on the Cartesian plane with $x^{'}$ and $y^{'}$ on the new rotated plane. See [link] .

The Cartesian plane with x - and y -axes and the resulting x ′− and y ′−axes formed by a rotation by an angle $θ .$

The original coordinate x - and y -axes have unit vectors $i$ and $j .$ The rotated coordinate axes have unit vectors $i^{'}$ and $j^{'} .$ The angle $θ$ is known as the angle of rotation . See [link] . We may write the new unit vectors in terms of the original ones.

\begin{array}{l} i^{'} = \cos θ i + \sin θ j \\ j^{'} = - \sin θ i + \cos θ j \end{array}

Relationship between the old and new coordinate planes.

Consider a vector $u$ in the new coordinate plane. It may be represented in terms of its coordinate axes.

\begin{array}{l} u = x^{'} i^{'} + y^{'} j^{'} \\ u = x^{'} (i \cos θ + j \sin θ) + y^{'} (- i \sin θ + j \cos θ) & \begin{matrix}  \end{matrix} Substitute . \\ u = i x' \cos θ + j x' \sin θ - i y' \sin θ + j y' \cos θ & \begin{matrix}  \end{matrix} Distribute . \\ u = i x' \cos θ - i y' \sin θ + j x' \sin θ + j y' \cos θ & \begin{matrix}  \end{matrix} Apply commutative property . \\ u = (x' \cos θ - y' \sin θ) i + (x' \sin θ + y' \cos θ) j & \begin{matrix}  \end{matrix} Factor by grouping . \end{array}

Because $u = x^{'} i^{'} + y^{'} j^{'},$ we have representations of $x$ and $y$ in terms of the new coordinate system.

\begin{matrix} x = x^{'} \cos θ - y^{'} \sin θ \\ and \\ y = x^{'} \sin θ + y^{'} \cos θ \end{matrix}

A General Note

Equations of rotation

If a point $(x, y)$ on the Cartesian plane is represented on a new coordinate plane where the axes of rotation are formed by rotating an angle $θ$ from the positive x -axis, then the coordinates of the point with respect to the new axes are $(x^{'}, y^{'}) .$ We can use the following equations of rotation to define the relationship between $(x, y)$ and $(x^{'}, y^{'}) :$

x = x^{'} \cos θ - y^{'} \sin θ

and

y = x^{'} \sin θ + y^{'} \cos θ

How To

Given the equation of a conic, find a new representation after rotating through an angle.

Find $x$ and $y$ where $x = x^{'} \cos θ - y^{'} \sin θ$ and $y = x^{'} \sin θ + y^{'} \cos θ .$
Substitute the expression for $x$ and $y$ into in the given equation, then simplify.
Write the equations with $x^{'}$ and $y^{'}$ in standard form.

Questions & Answers

Why is b in the answer

Dahsolar Reply

how do you work it out?

Brad Reply

answer

Ernest

heheheehe

Nitin

(Pcos∅+qsin∅)/(pcos∅-psin∅)

John Reply

how to do that?

Rosemary Reply

what is it about?

Amoah

how to answer the activity

Chabelita Reply

how to solve the activity

Chabelita

solve for X,,4^X-6(2^)-16=0

Alieu Reply

x4xminus 2

Lominate

sobhan Singh jina uniwarcity tignomatry ka long answers tile questions

harish Reply

t he silly nut company makes two mixtures of nuts: mixture a and mixture b. a pound of mixture a contains 12 oz of peanuts, 3 oz of almonds and 1 oz of cashews and sells for $4. a pound of mixture b contains 12 oz of peanuts, 2 oz of almonds and 2 oz of cashews and sells for $5. the company has 1080

ZAHRO Reply

If  , , are the roots of the equation 3 2 0, x px qx r     Find the value of 1  .

Swetha Reply

Parts of a pole were painted red, blue and yellow. 3/5 of the pole was red and 7/8 was painted blue. What part was painted yellow?

Patrick Reply

Parts of the pole was painted red, blue and yellow. 3 /5 of the pole was red and 7 /8 was painted blue. What part was painted yellow?

Patrick

how I can simplify algebraic expressions

Katleho Reply

Lairene and Mae are joking that their combined ages equal Sam’s age. If Lairene is twice Mae’s age and Sam is 69 yrs old, what are Lairene’s and Mae’s ages?

Mary Reply

23yrs

Yeboah

lairenea's age is 23yrs

ACKA

Katleho

Ello everyone

Katleho

Laurene is 46 yrs and Mae is 23 is

Solomon

hey people

christopher

age does not matter

christopher

solve for X, 4^x-6(2*)-16=0

Alieu

prove`x^3-3x-2cosA=0 (-π<A<=π

Mayank Reply

create a lesson plan about this lesson

Rose Reply

Excusme but what are you wrot?

<< Chapter < Page Page > Chapter >>

Practice Key Terms 3

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!

100% Free Mobile Applications
Receive real-time job alerts and never miss the right job again

Source: OpenStax, Algebra and trigonometry. OpenStax CNX. Nov 14, 2016 Download for free at https://legacy.cnx.org/content/col11758/1.6

Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Algebra and trigonometry' conversation and receive update notifications?

Ask

	3 Writing equations of rotated conics in standard form By OpenStax Read Online Course
	1 Identifying nondegenerate conics in general form By OpenStax Read Online Course
	6 Psychology MCQ 2010 2 Exam By John Gabrieli Start Exam
	Fireside Poets Quiz By Alec Moffit Start Quiz
	Music 113 By Eric Crawford Start Quiz
	2 Endocrinology Essay By Rohini Ajay Start Test
	38 Biology 38 The Musculoskeletal System MCQ By OpenStax Start Quiz
	Social Psychology MCQ By Saylor Foundation Start Quiz
	Engineering Communication MCQ By Steve Gibbs Start Quiz
	21 AP 21 Lymphatic Immune System Essay By OpenStax Start Flashcards
	Anthropology Aesthetics Culture By Richley Crapo Start Assignment
	9 Physiotherapy Modalities By Rhodes Start Exam