Sentences with AFFINE-GEOMETRY
Check out our example sentences below to help you understand the context.Sentences
1
"In affine geometry, parallel lines never intersect."
2
"The affine geometry of two dimensions is also known as Euclidean geometry."
3
"An affine geometry can be defined as a study of properties invariant under transformations that involve only translation, rotation, and scaling."
4
"The concept of affine geometry is widely used in computer graphics and computer vision."
5
"In affine geometry, the ratio of lengths of parallel line segments remains constant."
6
"An important concept in affine geometry is that of affine independence."
7
"Geometry based on the concept of similarity is often called affine geometry."
1
"The concept of a parallelism is an important notion in affine geometry."
2
"In affine geometry, the notion of distance is not considered."
3
"An affine transformation is a type of transformation commonly used in affine geometry."
4
"The study of perspective in art can be related to concepts in affine geometry."
5
"In affine geometry, the concept of collinearity is important."
6
"In affine geometry, the concept of a ratio of lengths is not defined."
7
"The concept of affine space is a fundamental concept in affine geometry."
8
"In affine geometry, the concept of symmetry is not considered."
9
"An affine combination is a concept used in affine geometry to express a point as a weighted sum of other points."
10
"In affine geometry, the ratio of areas is not defined."
11
"The study of transformations in computer graphics often relies on concepts from affine geometry."
12
"In affine geometry, two parallel lines never intersect."
13
"In affine geometry, lines do not have a notion of curvature."
14
"In affine geometry, the concept of congruence is not defined."
1
"In affine geometry, parallel lines do not necessarily meet in infinity as they do in projective geometry."
2
"An important concept in affine geometry is that of an affine space, which is a vector space equipped with a translation."
3
"One of the fundamental axioms of affine geometry is that any two points can be connected by a line segment."
4
"The study of symmetry in affine geometry plays a crucial role in understanding crystal structures."
5
"An affine transformation in two-dimensional affine geometry involves a combination of translation, rotation, scaling, and shearing."
6
"Many geometric proofs can be simplified by utilizing the principles of affine geometry."