Convert the Cartesian coordinate (-2,-6) to polar coordinates, 0 < 0 < 27, > 0 ra...
Convert the polar coordinate (6,(11pi)/6) to Cartesian coordinates.
(a) Find Cartesian coordinates for the polar point (-1, -1) and plot the point. (b) Find Polar coordinates with r > 0 and -1 < <a for the Cartesian point (-1, V3) and plot the point. (c) Convert the equation x2 + y2 = x to polar form and sketch the curve. (d) Convert the equation r = 5 csc @ to Cartesian form and sketch the curve.
Convert the Cartesian coordinate (-3,4) to polar coordinates, 0<theta<2pi
Part (b) only, The Cartesian coordinates of a point are given. (a) (-6, 6) (i) Find polar coordinates (r, 0) of the point, where r> 0 and 0 5 0 < 21. (6, 6) = ( 6v2, 37 (ii) Find polar coordinates (r, O) of the point, where r<0 and 0 S 0 < 21. (5, 6) = ( -622, 71 (b) (3,3V3) (i) Find polar coordinates (r, 0) of the point, where r>0 and 0 = 0 < 21....
Plot the point given in polar coordinates and find three additional polar representation of the point, using –211 << 21. (Copy the polar coordinate below to a sheet of paper and then graph the points. Label your points). (3 pts) Representations (Other three) A) (4,5) (3 pts) B) (-3, ---) 90° 4 120° 60° 3 150° 2 30° 180° 0° 210° 330° 240° 300° 2700
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.
[7] Rectangular coordinates of a point are given. Find the polar coordinates for each point such that r20 and 050<21. Sketches have been provided on the scratchwork page. (-2,-2/3) (8, - 8) (-2, 0) (-24, 7) 7 7
Find all solutions to 2 sin(0) = V3 on the interval 0 < 0 < 27 0 = Give your answers as exact values, as a list separated by commas. Check Answer
Find two sets of polar Coordinates for the point for os @ <211. - r = smaller Value large ualere
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) =