with(plots):Cirkel m. radius 1, centrum (0,1)_retpolarplot(2*sin(t),t=0..2*Pi);Kardioidepolarplot(2+2*sin(t),t=0..2*Pi);polarplot(2-2*sin(t),t=0..2*Pi);polarplot(1+cos(t),t=0..2*Pi);Man kan \357\277\275ndre konstanterne:polarplot(1+2*cos(t),t=0..2*Pi);Sk\357\277\275ring mellem kurver givet i pol\357\277\275re koordinater:polarplot({3*sin(t),1+sin(t)},t=0..2*Pi);Algebraisk giver ligningen 3*sin(t)=1+sin(t) kun l\357\277\275sningerne t=NiMlI3BpRw==/6 og t=5NiMqJiUjcGlHIiIiLSUmRmxvYXRHNiQiIiciIiEhIiI="Eksotiske kurver": roserpolarplot(sin(2*t),t=0..2*Pi);polarplot(sin(3*t),t=0..2*Pi);polarplot(sin(4*t),t=0..2*Pi);polarplot(sin(5*t),t=0..2*Pi);polarplot(1+2*sin(3*t),t=0..2*Pi);Man kan g\357\277\275 videre....S := t->100/(100+(t-Pi/2)^8): R := t -> S(t)*(2-sin(7*t)-cos(30*t)/2):
polarplot([R,t->t,-Pi/2..3/2*Pi],numpoints=2000);polarplot(exp(cos(t))-2*cos(4*t)+sin(t/4)^3,t=0..8*Pi);