
Convert the polar equation to rectangular form and sketch its graph. r = 7 cot(0) csc(O) Step 1 The polar coordinates (r, e) of a point are related to the rectangular coordinates (x, y) of the point as follows. x=rcos(0) cos y = r sin(0) sin e Step 2 The given polar equation can be rewritten as follows. r 7 cote csco 1 r = 7 coto sino 2 sin(0) = 7 coto Converting to rectangular coordinates using x =...
16) Write the following polar equation as a rectangular equation. r = 4 sin 0
Find the area outside the curve r = 2 and inside the curve r= 4 sino For the toolbar, press ALT.10 (RC)
b) r = 4 sin 8. 7. Convert each of the following equations from rectangular form to polar form. Solve for r. a) X = 3 b) x2 + (y + 2)2 = 4.
Convert the rectangular equation to polar form and select its graph. x2+y2 16
Convert the rectangular equation to polar form and select its graph. x2+y2 16
convert to rectangular form: r=3sin(theta)
Directions: In 1-6, determine the polar form of the given rectangular equation. (1) 36x² + 36y2 = 3600 A. 6 = 360° B. r=100 c. r=-10 D. r = 36 E. none of these [2] 16x - 5y = 20 A = 16 -5 cose + 20sine B. = 20cos 8 + 16 sine C. 20 16 cos8 - 5sin 8 D. 8 = tan * 72.646 E. none of these [3] y = x A. 0-45° B. 0-45° c....
Below is the transformation matrix between cylindrical and rectangular coordinates: P cos sino 0 i 0 = -sino cosy 09 2 0 0 1 When we found the velocity and acceleration in cylindrical coordinates, we had to find how each of the unit vectors changed in time. do do For this problem, just find de and 4 di
Remember that rectangular form is z = a + bi and that polar form is z = r(cos 0 + i sin o) Take following number in rectangular form and convert it to polar form: – 4 + 9i r = 0 =
Directions: In 1-6, determine the polar form of the given rectangular equation. [1] 36x +36y? - 3600 A. 0 = 360° B. = 100 c. r= -10 D. r = 36 E. none of these [2] 16x - 5y = 20 A. - 16 -5 cos 8 + 20 sine B. = -5 20 cose + 16 sin C. r = 20 16 cos @ Ssine D. @ = tan 16 5 72.646° E. none of these [3] y =...