What are the Polar Equations of the Polar Curves that are being defined by the following statements
Circle - oriented along negative x-axis - radius a/2
r=a cosθ, a<0
Circle - oriented along positive x-axis - radius a/2
r=a cosθ, a>0
Circle - oriented along negative y-axis - radius a/2
r=a sinθ, a<0
Circle - oriented along the positive y-axis - radius a/2
r=a sinθ, a>0
Limaçon -with a loop -oriented along the positive x-axis
r=a+b cosθ, where 0<a/b<1
Limaçon -with a dent -oriented along the positive x-axis
r=a+b cosθ, where 1<a/b<2
Limaçon -cardioid -oriented along the positive x-axis
r=a+b cosθ, where a/b=1
Limaçon -convex -oriented along the positive x-axis
r=a+b cosθ, where a/b≥2
Limaçon -with a loop -oriented along the positive y-axis
r=a+b sinθ, where 0<a/b<1
Limaçon -with a dent -oriented along the positive y-axis
r=a+b sinθ, where 1<a/b<2
Limaçon -cardioid -oriented along the positive y-axis
r=a+b sinθ, where a/b=1
Limaçon -convex -oriented along the positive y-axis
r=a+b sinθ, where a/b≥2
Limaçon -with a loop -oriented along the negative x-axis
r=a-b cosθ, where 0<a/b<1
Limaçon -with a dent -oriented along the negative x-axis
r=a-b cosθ, where 1<a/b<2
Limaçon -cardioid -oriented along the negative x-axis
r=a-b cosθ, where a/b=1
Limaçon -convex -oriented along the negative x-axis
r=a-b cosθ, where a/b≥2
Limaçon -with a loop -oriented along the negative y-axis
r=a-b sinθ, where 0<a/b<1
Limaçon -with a dent -oriented along the negative y-axis
r=a-b sinθ, where 1<a/b<2
Limaçon -cardioid -oriented along the negative y-axis
r=a-b sinθ, where a/b=1
Limaçon -convex -oriented along the negative y-axis
r=a-b sinθ, where a/b≥2
rose with 2n petals
r=acos(nθ), r=asin(nθ), where n is even
rose with n petals
r=acos(nθ), r=asin(nθ), where n is odd
Circle with a radius k
r=k
Line -with a slope of -a/b -with y-intercept k/b
r=k/(a cosθ+b sinθ )
Spiral with respect to θ
r=θ
Lemniscate symmetric to the polar axis, to θ = π/2 , and the pole
r²=a²cos2θ
Lemniscate symmetric to the pole
r²=a²sin2θ
A line that coincides with the terminal side of the angle θ=k
θ=k
