The Image And Preimage Have Different Orientations. The preimage and image are the same size and shape also and all the points correspond to each other. If x subseteq v is a subspace of v then its image t x is a subspace of w.
What is true for an image and a preimage in a reflection. If y subseteq w is a subspace of w then its preimage t 1 y is a subspace of v. The preimage and image are the same size and shape also and all the points correspond to each other.
What is the image of a 3 1 after a reflection first across the line y 3 and then across the line x 1.
Triangles pqr and p q r are congruent but their orientations are different. However the preimage and image are at different orientations around a central point. V rightarrow w between two vector spaces. Therefore by the definition of onto g is onto.