Question

The truncated conical container shown below is full of a beverage that weighs 0.40 oz/in^3
The container is 7 in.​ deep, 2.8 in. across at the​ base, and 3.6 in. across at the top. A straw sticks up 33 in. above the top.

Question: How much work does it take to suck up the beverage through the straw​ (neglecting friction)?

How much work is​ required?

Answer: _______ in-oz ​(Round to the nearest tenth as​ needed.)

The truncated conical container shown below is fll of a beverage that weighs 0.4 oz/in. The container is 7 in. deep, 2.8 in. across at the base, and 3.6 in. at the top. A straw sticks up 3 in. above the top. How much work does it take to suck up the beverage through the straw C across (neglecting friction)? y10 y17.5x-24.5 10-y (1.8,7) y+24.5 17.5 Ay 1.4 How much work is required? in-oz. |(Round to the nearest tenth as needed.)

Answer 1

C1.8,7) (1.4,0) SI Ope - 30 Dry 1.8 1.4 ym+b y 11.S - a4.5 hence vme Csiab) TL 8 D6.25 Cy+a4s] 4yx NO weiqut 306 5 Distance to move 6lab: ID-y yt ay s 0j) o4 xoy wosk dune. 306 25 7 (y+24 5) 306.25 (o-004 10) C10-g) y4au5)d IuD 45 49