convert to rectangular form: r=3sin(theta)
I know x=r cos(theta).
Y=rsin(theta) .
r^2=x^2+y^2.
Now question is:
r=3sin(theta).
Multiply both sides by r.
r^2=9rsin(theta).
X^2+y^2=9y.
Hence rectangle form:
X^+y^2-9y=0
convert to rectangular equation r=8sin theta
convert the rectangular coordinate to polar coordinates with r>0 and 0<theta<2pi (9sqrt3,-9) (r, theta)=?
what is the integral for the common area between the circles r = √3sin(theta) and r = cos(theta) ?
convert r= 4/2+sin(theta) to a rectangular equation
- Convert 2x + 5y^2 - 6y = 9 to a polar equation. T T T F Paragraph : Arial 3 (12pt) * D O Q ESETT: O fx Mashups - 16 © © E
Convert the polar equation to rectangular form. r = 12
Convert the polar equation r = sinθ - 2 cosθ to rectangular form.
Convert the polar equation to rectangular form. r = 3 cos e
Name: Convert the polar equation to rectangular form. 11. r-iosin θ 78 12. Find the eccentricity of the polar equation r-26+cos θ.
Name: Convert the polar equation to rectangular form. 11. r-iosin θ 78 12. Find the eccentricity of the polar equation r-26+cos θ.
1) Convert the following polar equation of r=2sintheta into a rectangular form. 2) List and find all of the sixth roots of 4.
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.