A small resort is situated on an island that lies exactly 3 miles from P, the nearest point to the island along a perfectly straight shoreline. 10 miles down the shoreline from P is the closest surfing school. A surfer can walk 5 miles per hour along the shore with the surfboard and can paddle 3 miles per hour to the island. The surfer can walk partway from the school along the shore and then paddle to the resort. How far down the shoreline from P should the surfer start surfing to get to the island as quick as possible. x: distance in miles from P, from where the surfer should start surfing . Surfy, Boogie, Windy, Sunny and Wavy individually set up a solution for the optimization problem. Who set up the problem properly? Surfy: Minimize 10-x 5 + V 9+22 when 0 SX s 10. 3 9+2 Sunny: Minimize 10- 3 + when 0 sxs 10. 5 Boogie: Minimize + 9+22 when 0 sxs 10. 3 O Windy: Minimize 5 - (10 – x) +3. V9+ x2 when 0 sxs 10. O Wavy : Minimize 5.2 +3. V 9 + x2 when 0 sxs 10.