Answer:
Part a) The height that the liquid forms equals 2.56 feet.
Part b) The number of trucks required are 361.
Step-by-step explanation:
When all the liquid mixture is spilled from the storage tank it will accumulate over the floor space.
Thus we infer
[tex]V_{spilled}=V_{accumulated}[/tex]
where
[tex]V_{spilled}[/tex] is spilled volume of mixture = [tex]2900m^{3}[/tex]
[tex]V_{accumulated}[/tex] is accumulated volume over the floor
Since the floor is smooth thus we conclude that the accumulated volume will form a prism of liquid with height 'h'
Thus
[tex]V_{accumulated}=Area\times h=40000\times h[/tex]
Equating both the volumes we get
[tex]40000\times h=2900m^{3}\times \frac{35.314ft^{3}}{m^{3}}=102412.533ft^{3}\\\\\therefore h=\frac{102412.533}{40000}=2.56 feet[/tex]
Thus the height formed by the liquid equals 2.56 feet.
Part b)
We know that the basic relation between density, mass and volume is
[tex]Mass=density\times volume[/tex]
Since it is given that the density of the liquid is 112% the density of water thus we have
[tex]density_{liquid}=1.12\times density_{water}\\\\density_{liquid}=1.12\times 1000=1120kg/m^3[/tex]
Thus the weight of the volume of liquid is
[tex]mass=2900\times 1120=3248000kg[/tex]
Now since it is given that 1 truck can carry 9000 kg of liquid thus by proportion the number of trucks need to carry 3248000 kilograms of liquid equals
[tex]n=\frac{3248000}{9000}=360.88\approx 361[/tex]
