「(geometry) Hyperbolic complex.」のEnglishの単語
上に「(geometry) Hyperbolic complex.」に関連する単語が表示されています。詳しく知りたい単語にマウスを合わせると定義が表示されます。検索アイコンをクリックするとより適切な単語を見つけられます。ChatGPTのおかげで、全体的な結果が大幅に改善されました。
検索結果
noun
- (geometry, hyperbolic geometry) An ideal point.
- An asymptotic point in 3-dimensional space, viewed from some point, at which parallel lines appear to meet and which in perspective drawing is represented as a vanishing point.
- (geometry, Euclidean projective geometry) Any point added to a space to achieve projective completion.
adj
adj
- (mathematics, of a function of hyperreals) Both additive and homogeneous for hyperreal scalars.
- (dermatology) Having unusually pronounced creases marking the skin.
- (mathematics, curve fitting) Increasing exponentially or as a higher polynomial power.
- (mathematics, of groups) Displaying a generalization of sofic that applies to finite-dimensional Hilbert spaces.
- (mathematics, of a sequence) Converging very quickly to a limit so that the ratio of adjacent terms tends to zero.
noun
- (geometry, hyperbolic geometry) An ideal point.
- An asymptotic point in 3-dimensional space, viewed from some point, at which parallel lines appear to meet and which in perspective drawing is represented as a vanishing point.
- (geometry, Euclidean projective geometry) Any point added to a space to achieve projective completion.
一致する単語が見つかりませんでした。より広い説明を試してください。
adj
adj
- (mathematics, of a function of hyperreals) Both additive and homogeneous for hyperreal scalars.
- (dermatology) Having unusually pronounced creases marking the skin.
- (mathematics, curve fitting) Increasing exponentially or as a higher polynomial power.
- (mathematics, of groups) Displaying a generalization of sofic that applies to finite-dimensional Hilbert spaces.
- (mathematics, of a sequence) Converging very quickly to a limit so that the ratio of adjacent terms tends to zero.