a triangle is to be reflected about an arbitrary line from the following which the transformation will be performed the second
Answers
Answered by
4
Answer:
2D TRANSFORMATIONS (Contd.)
Consider the following figure where a position vector p(x,y) which makes ... rotatation of 90 about the origin followed by reflection through the line y = -x. ... A sequence of transformations can be lumped in a.
Answered by
0
Reflection of a triangle about an arbitrary line can be performed in a 2D plane using a translation transformation.
- Translational transformation is a type of transformation in 2D or 3D space that involves moving an object by a fixed distance along a straight line in a specific direction.
- In other words, it is a translation of an object from one position to another without rotating or changing its shape.
- In a translation transformation, all the points within the object are moved in a very line within the same direction.
- The size, form, and also orientation of the image are identical to that of the first object.
- The same orientation implies that the item and image face the identical direction.
- We describe a translation in terms of the number of units moved to the correct or left and also the number of units moved up or down.
- This can be represented mathematically by a translation matrix or by a vector representing the direction and magnitude of the translation.
#SPJ3
Similar questions