Solution;
a). The polar point is
The rectangular equation is
Then
The rectangular equation is
b) the polar equation is
Then,
The rectangular equation
Answer =(0,-2)
C) the polar equation is
The rectangular equation is
And
Answer (1,0)
Question 4 Convert the given polar coordinates to rectangular coordinates. (a) (6,35) *)(-2,- ) (c) (1,0)
Question 3 Convert the given rectangular coordinates to polar coordinates (a) (4,-4) (6 (2,2V3)
6. A point is given in rectangular coordinates. Convert the point to polar coordinates. (There are many answers). (2 pts) A) (4, -3) (2 pts) B) (-1,v3)
5. A point is given in polar coordinates. Convert the point to rectangular coordinates. (2 pts) A) (2,5) (2 pts) B) (3.-5)
[7] Rectangular coordinates of a point are given. Find the polar coordinates for each point such that r 20 and 050<21. Sketches have been provided on the scratchwork page. (-2, -213) (8,-8) (-1,0) (-24, 7)
[7] Rectangular coordinates of a point are given. Find the polar coordinates for each point such that r 20 and 050<27. Sketches have been provided on the scratchwork page. (-2, -213) (8,-8) (-1,0) (-24, 7)
Find the rectangular coordinates for the point whose polar coordinates are given. 8 TT 6 (x, y) = ) =( Convert the rectangular coordinates to polar coordinates with r> 0 and 0 se<2n. (-2, 2) (r, 0) Convert the rectangular coordinates to polar coordinates with r> 0 and O So<211. (V18, V18) (r, ) = Find the rectangular coordinates for the point whose polar coordinates are given. (417, - ) (x, y) =
Question 13 Polar coordinates of a point are given. Find the rectangular coordinates of the point. (4, -180) (4,0) (-4,0) (0,4) (0,-4) hp
Solve and give exact answer in rectangular form. x +27-0 Convert to polar coordinates. Solve and give exact answer in rectangular form. x +27-0 Convert to polar coordinates.
Dynamic 4. Compare rectangular coordinates with polar coordinates and cylindrical coordinates. Rectangular Cylindrical Polar X, Y. Z R 5. For a circular motion, what are the normal and tangential components of the acceleration in the polar coordinates. Normal component ? Tangential component ? m 4. Compare rectangular coordinates with polar coordinates and cylindrical coordinates. Rectangular Cylindrical Polar X, Y. Z R 5. For a circular motion, what are the normal and tangential components of the acceleration in the polar coordinates....
4. Given a point (-3,-) in polar representation, answer each question. a) Plot the point b) Find two additional polar representations, using -2n< < 26 c) Convert to rectangular coordinates. 5. Convert the rectangular point (V3.1) to polar coordinates where 0 <<2 6. Given a polar equation r = 4sin e a) Sketch the graph of the polar equation by completing the table. r 0 FT/6 1/2 5/6 b) Convert the polar equation into a rectangular equation,