REVIEW 9.1-9.4 Polar Coordinates and Equations
description
Transcript of REVIEW 9.1-9.4 Polar Coordinates and Equations
![Page 1: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/1.jpg)
REVIEW 9.1-9.4REVIEW 9.1-9.4
Polar Coordinates and Polar Coordinates and EquationsEquations
![Page 2: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/2.jpg)
You are familiar with plotting with a rectangular coordinate system.
We are going to look at a new coordinate system called the polar coordinate system.
![Page 3: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/3.jpg)
The center of the graph is called the pole.
Angles are measured from the positive x axis.
Points are represented by a radius and an angle
(r, )
radius angle
To plot the point
4,5
First find the angle
Then move out along the terminal side 5
![Page 4: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/4.jpg)
A negative angle would be measured clockwise like usual.
To plot a point with a negative radius, find the terminal side of the angle but then measure from the pole in the negative direction of the terminal side.
4
3,3
3
2,4
![Page 5: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/5.jpg)
330315
300
270240
225
210
180
150
135
120
0
9060
30
45
Polar coordinates can also be given with the angle in degrees.
(8, 210°)
(6, -120°)
(-5, 300°)
(-3, 540°)
![Page 6: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/6.jpg)
Let's plot the following points:
2,7
2,7
2
5,7
2
3,7
Notice unlike in the rectangular coordinate system, there are many ways to list the same point.
![Page 7: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/7.jpg)
Name three other polar coordinates that represent that same point given:
1.) (2.5, 135°) 2.) (-3, 60°)
(2.5, -225°)(-2.5, -45°)(-2.5, -315°)
(-3, -310°)(3, 240°)(3, -120°)
![Page 8: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/8.jpg)
Let's generalize the conversion from polar to rectangular coordinates.
r
xcos
,r
r yx
r
ysin
cosrx
sinry
![Page 9: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/9.jpg)
Steps for Converting Equations from Rectangular to Polar form and vice versa
Four critical equivalents to keep in mind are:
€
=Arc tany
x
⎛
⎝ ⎜
⎞
⎠ ⎟
€
=Arc tany
x
⎛
⎝ ⎜
⎞
⎠ ⎟+ π
If x > 0 If x < 0
![Page 10: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/10.jpg)
Identify, then convert to a rectangular equation and then graph the equation:
Circle with center at the pole and radius 2.
![Page 11: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/11.jpg)
![Page 12: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/12.jpg)
The graph is a straight line at extending through the pole.
3
IDENTIFY and GRAPH:
€
=3
![Page 13: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/13.jpg)
Now convert that equation into a rectangular equation:
€
=3
€
Arc tany
x
⎛
⎝ ⎜
⎞
⎠ ⎟=
π
3
€
y
x= tan
π
3
⎛
⎝ ⎜
⎞
⎠ ⎟
€
y
x= tan
π
3
⎛
⎝ ⎜
⎞
⎠ ⎟
Take the tan of both sides:
Cross multiply:
€
y
x= 3
€
y = 3x
€
3x − y = 0
![Page 14: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/14.jpg)
The graph is a horizontal line at y = -2
IDENTIFY, GRAPH, AND THEN CONVERT TO ARECTANGULAR EQUATION:
€
rsinθ = −2
![Page 15: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/15.jpg)
GRAPH EACH POLAR EQUATION.
1.) r = 3 2.) θ = 60°
![Page 16: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/16.jpg)
Graph: r cos 3 θ r
0° -3
30° -3.5
60° -6
90° UD
120° 6
150° 3.5
180° 3
210° 3.5
240° 6
270° UD
300° -6
330° -3.5
360° -3
€
r =−3
cosθ
![Page 17: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/17.jpg)
IDENTIFY, GRAPH, AND THEN CONVERT TO ARECTANGULAR EQUATION:
€
r = 4 cosθθ r
0° 4
30° 3.5
60° 2
90° 0
120° -2
150° -3.5
180° -4
210° -3.5
240° -2
270° 0
300° 2
330° 3.5
360° 4
![Page 18: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/18.jpg)
r 6sin
![Page 19: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/19.jpg)
r 4 4cos r 4 4cos
Cardioids (heart-shaped curves) where a > 0 and passes through the origin
r a a cos r a a cos
![Page 20: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/20.jpg)
a a sin a a sin
4 4sin 4 4sin
![Page 21: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/21.jpg)
r 5 4sin
r 5 4sin
r 5 3cos
r 5 4cos
![Page 22: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/22.jpg)
r 2 5sin
r 4 5sin r 3 5cos
r 4 5cos
![Page 23: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/23.jpg)
r 4sin 3
r 4sin 4
r 4cos3
r 4cos 4
![Page 24: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/24.jpg)
4
2
2
4
5 5
2r 9sin 2 Not on our quiz!
![Page 25: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/25.jpg)
4
2
2
4
5 5
2r 9cos 2Not on our quiz!
![Page 26: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/26.jpg)
Can you graph each equation on the same graph?r cos 3
Vertical Line
r sin 3
Horizontal Line
r 2cos 5sin 3 0
General Line
€
r =3
cosθ
€
r =3
sinθ
€
r =3
2cosθ + 5sinθ
![Page 27: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/27.jpg)
Can you graph each circle on the same graph??
r 5
r 2cos
r 4sin
![Page 28: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/28.jpg)
Can you graph both equations on the same graph??
r
r 2 4sin
4 2cos
r
r a bsin
a bcos
Note: INNER loopOnly if a < b
![Page 29: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/29.jpg)
Can you graph each spriral below?
€
r = 2θ
€
r =θ
3
![Page 30: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/30.jpg)
Graph each equation
r 5cos3 r 6sin4
r asin n
r bsin n
n even – 2n pedalsn odd – n pedals
![Page 31: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/31.jpg)
Graph: r = 2 + 3cosθ
θ r
0° 5
30° 4.6
60° 3.5
90° 2
120° 0.5
150° -0.6
180° -1
210° -0.6
240° 0.5
270° 2
300° 3.5
330° 4.6
360° 5
LIMACON WITH INNER LOOP
![Page 32: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/32.jpg)
Graph: r = 3sin 3θ
θ r
0° 0
30° 3
60° 0
90° -3
120° 0
150° 3
180° 0
210° -3
240° 0
270° 3
300° 0
330° -3
360° 0
Rose with 3 petals
![Page 33: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/33.jpg)
Let's take a point in the rectangular coordinate system and convert it to the polar coordinate system.
(3, 4)
r
Based on the trig you know can you see how to find r and ?
4
3r = 5
222 43 r
3
4tan
93.03
4tan 1
We'll find in radians
(5, 0.93)polar coordinates are:
![Page 34: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/34.jpg)
Let's generalize this to find formulas for converting from rectangular to polar coordinates.
(x, y)
r y
x
222 ryx
x
ytan
22 yxr
x
y1tan or
€
tan−1 y
x
⎛
⎝ ⎜
⎞
⎠ ⎟+ π
If x > 0If x < 0
![Page 35: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/35.jpg)
Now let's go the other way, from polar to rectangular coordinates.
Based on the trig you know can you see how to find x and y?
44cos
x
rectangular coordinates are:
4,4
4 yx4
222
24
x
44sin
y
222
24
y
2
2,
2
2
![Page 36: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/36.jpg)
Convert each of these rectangular coordinates to polar coordinates:1.) 2.)
3.) 4.)
5.) 6.)
€
0, 4( )
€
4, π2( )
€
1
2,
− 3
2
⎛
⎝ ⎜
⎞
⎠ ⎟
€
− 3
2,
1
2
⎛
⎝ ⎜
⎞
⎠ ⎟
€
4, 0( )
€
−1, − 3( )
€
2, 2( )
€
1, −π3( )
€
1, 5π6( )
€
4, 0( )
€
2, 4π3( )
€
2 2, π4( )
![Page 37: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/37.jpg)
Convert each of these polar coordinates to rectangular coordinates:1.) 2.)
3.) 4.)
5.) 6.)
€
6,120°( )
€
−3, 3 3( )€
−4, 45°( )
€
3, 300°( )
€
4, π6( )
€
0,13π3( )
€
3, −3π4( )
€
−2 2, − 2 2( )
€
3
2,
−3 3
2
⎛
⎝ ⎜
⎞
⎠ ⎟
€
2 3, 2( )
€
0, 0( )
€
−3 2
2,
−3 2
2
⎛
⎝ ⎜
⎞
⎠ ⎟
![Page 38: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/38.jpg)
Steps for Converting Equations from Rectangular to Polar form and vice versa
Four critical equivalents to keep in mind are:
€
=Arc tany
x
⎛
⎝ ⎜
⎞
⎠ ⎟
€
=Arc tany
x
⎛
⎝ ⎜
⎞
⎠ ⎟+ π
If x > 0 If x < 0
![Page 39: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/39.jpg)
Convert the equation: r = 2 to rectangular form
Since we know that , square both sides of the equation.
![Page 40: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/40.jpg)
We still need r2, but is there a better choice than squaring both sides?
![Page 41: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/41.jpg)
Convert the following equation from rectangular to polar form.
2 2x y x
and
Since
x r cos2r r cosr cos
![Page 42: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/42.jpg)
Convert the following equation from rectangular to polar form.
2 22x 2y 3 2 22(x y ) 3
2 2 3x y
2
3r
2
2 3r
2
![Page 43: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/43.jpg)
922 yx
Convert the rectangular coordinate system equation to a polar coordinate system equation.
22 yxr 3r
r must be 3 but there is no restriction on so consider all values.
Here each r unit is 1/2 and we went out 3
and did all angles.
? and torelated was
how s,conversion From22 yxr
Before we do the conversion let's look at the graph.
![Page 44: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/44.jpg)
Convert the rectangular coordinate system equation to a polar coordinate system equation.
yx 42
cosrx
sinry
sin4cos 2 rr
sin4cos22 rr
substitute in for x and y
What are the polar conversions we found for x and y?
€
rcos2 θ = 4sinθ
€
r =4sinθ
cos2 θ
€
r = 4 tanθ secθ
![Page 45: REVIEW 9.1-9.4 Polar Coordinates and Equations](https://reader033.fdocuments.in/reader033/viewer/2022061410/56813a4b550346895da2424a/html5/thumbnails/45.jpg)
WRITE EACH EQUATION IN POLAR FORM:
1.) 2.)
€
2 = y − 2x
€
x =11
€
2 5
5= rcos(θ −153°)
€
11 = rcosθ