A 10cm×10cm×10cm wood block with a density of 700 kg/m3 floats in water.
Part B
If it's seawater? Suppose that ρ=1030kg/m3.
A 10cm×10cm×10cm wood block with a density of 700 kg/m3 floats in water. Part B If...
A 10cm×10cm×10cm wood block with a density of 650 kg/m3 floats in water. Part A What is the distance from the top of the block to the water if the water is fresh? . Part B If it's seawater? Suppose that ρ=1030kg/m3.
Oil having a density of 926 kg/m3 floats on water. A rectangular block of wood 3.60 cm high and with a density of 960 kg/m3 floats partly in the oil and partly in the water. The oil completely covers the block. How far below the interface between the two liquids is the bottom of the block?
Oil having a density of 925 kg/m3 floats on water. A rectangular block of wood 5.00 cm high and with a density of 960 kg/m3 floats partly in the oil and partly in the water. The oil completely covers the block. How far below the interface between the two liquids is the bottom of the block? cm
Oil having a density of 923 kg/m3 floats on water. A rectangular block of wood 4.4 cm high and with a density of 968 kg/m3 floats partly in the oil and partly in the water. The oil completely covers the block. How far below the interface between the two liquids is the bottom of the block? Answer in units of m.
A 10 cm * 10 cm * 10cm block of wood with density 700 kg/m^3 is held underwater by a string tied to the bottom of the container. a) What is the tension of the string? b) Will the block float or sink if the string is removed? If it floats and after reaching equilibrium, what will be the volume portion of the block above water surface? c) What should be the mass of a piece of metal put on...
21. Oil having a density of 930 kg/m floats on water. A rectangular block of wood 6.00 cm high and with a density of 960 kg/m) floats partly in the oil and partly in the water. The oil completely covers the block. How far below the interface between the two liquids is the bottom of the block? (15 points) oil Wood block water I
A block of wood of mass 2kg floats in water, and it is noted
that volume is 3/4 is submerged. density of water 1000
kg/m3.
a) What is the buoyant force of the block? hint:
V is volume and g is 9.81 m/s2.
b) What is the density of the block?
A cube of wood having an edge dimension of 20cm and density of 600 kg/m3 floats in water that has a density if 1000kg/m3. what is the distance from the top horizontal surface of the cube of the water surface?
IP A block of wood floats on water. A layer of oil is now poured on top of the water to a depth that more than covers the block, as shown in the figure(Figure 1). If 93 % of the wood is submerged in water before the oil is added, find the fraction submerged when oil with a density of 865 kg/m3 covers the block. Express your answer using two significant figures.
a cubical block of wood (density 850 kg/m^3) of height 28cm floats in water( density 1000kg/m^3). What is the height of the block above the surface of water? a)5.1cm b)4.2cm c) .92 cm d) 10.8 cm e) 1.11 cm