Methodology of implementing digital technologies in teaching the theme of second-order surfaces
Problem 4. Determine the relative position of the hyperbolic paraboloid
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Problem 4. Determine the relative position of the hyperbolic paraboloid
� � � − � � � = �� and the plane � − � + � = � : with(plots):implicitplot3d([x^2/5-y^2/4-6*z=0,x-y+6=0], x=-10..10, y=-25..25, z=-10..10); Figure 4. Intersection of a hyperbolic paraboloid and a plane Conclusion: So, by using the Maple software package for solving mathematical problems, you can describe not only standard geometric figures, but also complex surfaces defined by various formulas (including a paraboloid, ellipsoid, hyperboloid or hyperbolic paraboloid), and their sections. From the above examples, it can be seen, that when spatial circular figures are mutually positioned, it is necessary to solve their equations together, but in this case, it formed two systems of equations with eISSN: 2349-5715 pISSN: 2349-5707 Volume: 10, Issue 12, Dec-2023 SJIF 2019: 4.702 2020: 4.737 2021: 5.071 2022: 4.919 2023: 6.980 227 three variables. It is known that such a system of equations has infinitely many solutions. That is, there is no specific solution for them. It can be seen that to show the domain of their solutions, it is necessary to determine the domain of their intersection. In the first example it is a circle, in the second example it is an ellipse, in the third example it is a hyperbola, and in the fourth example it is a curve line. If we can describe the appearance of these shapes in 3D as they move into three- dimensional space, then using a computer it will be possible to express the result from different angles. In this case, students will have the opportunity to learn more deeply about the topic "Surfaces of the second order" in the course of analytical geometry. Yüklə 30,43 Kb. Dostları ilə paylaş:
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