Quadrilateral CART is dilated with the center at the origin and a scale factor of Describe Quadrilateral CART and Quadrilateral C'A'R'T' by Completing the table below with the most appropriate answer. Quadrlateral CART Quadrlateral CART (x, y) C(-5, 15) A( A'(12,6) RC R'(-24, -12) T(-25,0) T'(

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**Dilation of Quadrilateral CART** **Concept Explanation:** Quadrilateral CART is subjected to a dilation transformation with the center at the origin, employing a scale factor of \( \frac{3}{5} \). **Objective:** Complete the table comparing Quadrilateral CART and its dilated counterpart, Quadrilateral \( C'A'R'T' \). **Table:** | Quadrilateral CART | Quadrilateral \( C'A'R'T' \) | |---------------------|------------------------------| | \((x, y)\) | \(( \ , \ )\) | | \(C(-5, 15)\) | \(C'( \ , \ )\) | | \(A( \ , \ )\) | \(A'(12, 6)\) | | \(R( \ , \ )\) | \(R'(-24, -12)\) | | \(T(-25, 0)\) | \(T'( \ , \ )\) | **Instructions:** 1. Understand Dilation: Dilation is a transformation that changes the size of a figure but not its shape. Every coordinate of the figure is multiplied by the scale factor. 2. Calculate Coordinates: - For each point \((x, y)\) on CART, find the corresponding point \((x', y')\) on \(C'A'R'T'\) using: \[ x' = \frac{3}{5} \cdot x, \quad y' = \frac{3}{5} \cdot y \] 3. Solve the table by applying these calculations to each coordinate in Quadrilateral CART. Use this approach to explore and solve transformations involving dilations on the coordinate plane.