Answer:
Step-by-step explanation:
To describe the translation from shape K to shape L as a vector, we need to determine the movement or displacement from one shape to the other in terms of direction and distance.
From the provided information, it seems there is a translation described by the vector \( \langle -1, 1 \rangle \).
Let's break this down:
- The vector \( \langle -1, 1 \rangle \) indicates a movement:
- Left (negative direction) by 1 unit in the horizontal (x) direction.
- Up (positive direction) by 1 unit in the vertical (y) direction.
Therefore, the translation from shape K to shape L can be described as moving left by 1 unit and up by 1 unit. This vector \( \langle -1, 1 \rangle \) represents the direction and magnitude of the translation from shape K to shape L.
