TY  - THES
N1  - Pembimbing: Pipit Pratiwi Rahayu, S.Si., M.Si.
ID  - digilib58426
UR  - https://digilib.uin-suka.ac.id/id/eprint/58426/
A1  - Alfiah Fitriana, NIM.: 17106010024
Y1  - 2023/04/03/
N2  - Geometry is one of the elements in mathematics that is used in identifying from one form to another. In geometry there are spatial geometry and plane geometry. One of the interesting discussions of plane geometry is the shape and equations in the two-dimensional plane that can be developed into a three-dimensional plane.
This study discusses the development of conic sections into three-dimensional planes in the form of hyperbolic paraboloids and elliptic paraboloids. From the results of expanding the conic sections, we can obtain geometric equations in the form of a paraboloid resulting from a rotating parabola on the X, Y, and Z axes, a hyperbolic paraboloid, and an elliptic paraboloid resulting from a combination of one or two curve shapes. This understanding will be easier to understand with a few examples.
PB  - UIN SUNAN KALIJAGA YOGYAKARTA
KW  - geometry; paraboloids; hyperbolic paraboloids; elliptic paraboloids; conic sections
M1  - skripsi
TI  - PARABOLOIDA PADA RUANG EUCLID DIMENSI-3
AV  - restricted
EP  - 92
ER  -