Eğitim Bilimleri Fakültesi / Faculty of Education
Permanent URI for this collectionhttps://hdl.handle.net/11727/2116
Browse
3 results
Search Results
Item On The Matrix Representation Of 5th Order Bezier Curve And Its Derivatives In E-3(2022) Kilicoglu, Seyda; Senyurt, SuleymanUsing the matrix representation form, the first, second, third, fourth, and fifth derivatives of 5th order Bezier curves are examined based on the control points in E-3. In addition to this, each derivative of 5th order Bezier curves is given by their control points. Further, a simple way has been given to find the control points of a Bezier curves and its derivatives by using matrix notations. An example has also been provided and the corresponding figures which are drawn by Geogebra v5 have been presented in the end.Item On the Involute of the Cubic Bezier Curve By Using Matrix Representation in E-3(2020) Kilicoglu, Seyda; Senyurt, SuleymanIn this study we have examined, involute of the cubic Bezier curve based on the control points with matrix form in E-3. Frenet vector fields and also curvatures of involute of the cubic Bezier curve are examined based on the Frenet apparatus of the first cubic Bezier curve in E-3.Item ON THE SECOND ORDER INVOLUTE CURVES IN E-3(2017) Kilicoglu, Seyda; Senyurt, SuleymanIn this study we worked on the involute of involute curve of curve alpha. We called them the second order involute of curve alpha in E-3. All Frenet apparatus of the second order involute of curve alpha are examined in terms of Frenet apparatus of the curve alpha. Further we show that; Frenet vector fields of the second order involute curve alpha(2) can be written based on the principal normal vector field of curve alpha. Besides, we illustrate examples of our results.