It's very interesting that the parallel curve of parabola is not parabola..you can draw a parabola on your paper and use pen to go on by the line; you will see the parallel of the parabola will cross itself, so that's true the parallel of the parabola is not parabola; It's same to circle and sin curve;
Here is a useful formula to calculate the parallel curve and curvature and the radius of the curvature:
![X[x,y]=x+\frac{ay'}{\sqrt {x'^2+y'^2}}](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_s3HA15_QjHN9e0yBUMN_0R8DvrJSKFfVsxeTgirfAJ_izQLZt7bQ5saelIGdyq3rGZG8fklR_5_d01nbIhv8WX5JChQPiSQelC4Acd0xpvT5zXEVavP4aE6u1oniF3E6K_jgplf-af7PZTHxBh=s0-d)
![Y[x,y]=y-\frac{ax'}{\sqrt {x'^2+y'^2}}](https://lh3.googleusercontent.com/blogger_img_proxy/AEn0k_vPGBGNb_74yGiCGb1aVK1NaU1rRrAopnDq4eBJ2zchqkVv8V561BxrqOOu66-ZQEY299pviH2wEfjqerMxeNdXuvwRnAsm3TKd0BK4TZeGsqdRGOX5M3gfl-THMaZKzlcXB-v-m--u43A7WVsFGA=s0-d)
Here y=f(t);x=g(t); X and Y are coordinate of the parallel curve.
See more:
http://en.wikipedia.org/wiki/Parallel_curvehttp://www.jstor.org/stable/3027202?seq=5
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