Answer:
1232
Step-by-step explanation:
Sure, here's a more condensed version:
Given that solids X and Y are similar with volumes 63 cm³ and 343 cm³ respectively, and the surface area of X is 176 cm², we can find the scale factor between the two solids using the volume ratio. The scale factor is found to be \( \sqrt[3]{7} \). Since surface area is proportional to the square of linear dimensions, the surface area of Y is calculated as \( 176 \times 7 = 1232 \) cm². Therefore, the surface area of Y is 1232 cm².
