Final answer:
To dilate triangle ABC using center P with a scale factor of 3/2, measure the distances from P to each vertex of ABC, multiply them by 3/2 to find the new vertices, and then connect these points to form the dilated triangle A'B'C'.
Step-by-step explanation:
How to Dilate Triangle ABC Using Center P and a Scale Factor of 3/2
To dilate triangle ABC using center P with a scale factor of 3/2, follow these steps:
- Locate point P on the plane, which will be the center of dilation.
- Measure the distances from point P to each vertex of triangle ABC (PA, PB, and PC).
- Multiply these distances by the scale factor of 3/2 to get the new distances from point P to the dilated vertices (PA', PB', and PC').
- From point P, use a straight edge and compass to locate the new points A', B', and C' at the new distances.
- Connect the points A', B', and C' to form the dilated triangle A'B'C'.
This process will give you triangle A'B'C' that is a dilation of triangle ABC by a scale factor of 3/2 centered at point P.