plete all problems on separate paper. You must write all equations. In problems 1-4, technology be used to solve or find derivatives, but you must include this with your work if you do. Problem 5...
plete all problems on separate paper. You must write all equations. In problems 1-4, technology be used to solve or find derivatives, but you must include this with your work if you do. Problem 5 may will be in CoCalc. 1. A hallway that is 8 feet wide meets another hallway 5 feet wide. What is the shortest length from one wall to another that touches the inside corner as shown in the diagram? (hint: you need Pythagorean Theorem and similar triangles) 2. A swimmer is 200 feet from shore and Jane, the lifeguard, is 200 feet down the shore from closest point. She can run 18 ft/s and can swim at a rate of 5 ft/s. Minimize the time it would o reach the swimmer
plete all problems on separate paper. You must write all equations. In problems 1-4, technology be used to solve or find derivatives, but you must include this with your work if you do. Problem 5 may will be in CoCalc. 1. A hallway that is 8 feet wide meets another hallway 5 feet wide. What is the shortest length from one wall to another that touches the inside corner as shown in the diagram? (hint: you need Pythagorean Theorem and similar triangles) 2. A swimmer is 200 feet from shore and Jane, the lifeguard, is 200 feet down the shore from closest point. She can run 18 ft/s and can swim at a rate of 5 ft/s. Minimize the time it would o reach the swimmer