A rectangular wooden block of weight W floats with exactly one-half of its volume below the waterline.?
Part
a. What is the buoyant force acting on the block?
a. 2W
b. W
c. 1/2 *(W)
d. The buoyant force cannot be determined. Part
b. The density of water is 1.00 {g/cm^3}. What is the density of the block?
a. 2.00 {g/cm^3}
b. between 1.00 and 2.00 {g/cm^3}
c. 1.00 {g/cm^3}
d. between 0.50 and 1.00 {g/cm^3} E. 0.50 {g/cm^3} F. The density cannot be determined.

Question

adiapcalmGrahcooli adiapcalmGrahcooli

17-04-2016
Mathematics

Answered

A rectangular wooden block of weight W floats with exactly one-half of its volume below the waterline.?
Part
a. What is the buoyant force acting on the block?
a. 2W
b. W
c. 1/2 *(W)
d. The buoyant force cannot be determined. Part
b. The density of water is 1.00 {g/cm^3}. What is the density of the block?
a. 2.00 {g/cm^3}
b. between 1.00 and 2.00 {g/cm^3}
c. 1.00 {g/cm^3}
d. between 0.50 and 1.00 {g/cm^3} E. 0.50 {g/cm^3} F. The density cannot be determined.

Answer :

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brackenbury87 brackenbury87 · Answer 1 · 2016-04-17T12:57:03-04:00

For part a:
Archimedes' principle states that the buoyancy force acting on an immersed object is equal to the weight of the fluid displaced. Because half of W displaces the water, the force must also equal half of W.
So the answer is c] (1/2) ×W.

For part b:
For an object to float entirely above water, the density of that object has to be greater or equal to the density of the water (1.00 g/cm³). So for half of it to lie below the waterline, it must be half as dense (0.5 g/cm³).
So the answer is e] 0.5 g/cm³.

Hope this helps!