![Descriptive geometry . er, as in the ellipsoid, Fig. 291, can neverrepresent more than two points in the surface. 170. Tangent Planes to Double Curved Surfaces of Revolution,(a) A plane tangenl to Descriptive geometry . er, as in the ellipsoid, Fig. 291, can neverrepresent more than two points in the surface. 170. Tangent Planes to Double Curved Surfaces of Revolution,(a) A plane tangenl to](https://c8.alamy.com/zooms/6/57e87d1ff23047bf904aaf6417d5fd94/2akbmrt.jpg)
Descriptive geometry . er, as in the ellipsoid, Fig. 291, can neverrepresent more than two points in the surface. 170. Tangent Planes to Double Curved Surfaces of Revolution,(a) A plane tangenl to
Egy másik sajátos kosárgörbéről Előző dolgozatunkban – melynek címe: Egy sajátos kosárgörbéről – szó esett k
![This Image Shows How To Build A Cycloid. The Circle C = 3.14 D. Divide The Rolling Circle & The Base Line C Into A Number Of Equal Parts, Draw Through The This Image Shows How To Build A Cycloid. The Circle C = 3.14 D. Divide The Rolling Circle & The Base Line C Into A Number Of Equal Parts, Draw Through The](https://us.123rf.com/450wm/morphart/morphart1910/morphart191076219/132911185-this-image-shows-how-to-build-a-cycloid-the-circle-c-3-14-d-divide-the-rolling-circle-the-base.jpg)