How does a scale drawing that is larger than the object it represents relate to a geometric transformation?(1 point)
A scale drawing that is larger than the object it represents is an example of a geometric transformation known as enlargement or dilation. This transformation involves multiplying the coordinates of the object by a scale factor to create a larger image.
When a scale drawing is larger than the object it represents, it indicates a geometric transformation known as enlargement or dilation. This transformation involves enlarging or stretching the original object uniformly in all directions while maintaining the object's proportions.
To understand this geometric transformation, you can follow these steps:
1. Start with the original object or shape that you want to represent with a scale drawing.
2. Determine the scale factor, which is the ratio of the lengths of corresponding sides in the scale drawing and the actual object. For example, if the scale factor is 2:1, it means that the scale drawing is twice as large as the actual object.
3. Multiply the length of each side of the original object by the scale factor. This will give you the corresponding lengths for the scale drawing.
4. Use these new lengths to create the scale drawing, ensuring the proportions of the original object are maintained as you enlarge or stretch it uniformly in all directions.
In summary, when a scale drawing is larger than the object it represents, it implies that the original object has undergone an enlargement or dilation, which involves multiplying the lengths of each side by a scale factor to create the corresponding lengths for the scale drawing.