Since 33751/3, the cube root of 3375, is equal to 15, each side of the cube is 15 inches.
15x6=90
the side length is 15 inches.side length:= cube root of 3375 in3= 15check:volume of cube = s3 = 153 or 15 *15*15 = 3375
The LCM is: 16,875
Including 1, there are 21 perfect cubes between one and ten thousand. These are: 1, 8, 27, 64, 125, 216, 343, 512, 729, 1000, 1331, 1728, 2197, 2744, 3375, 4096, 4913, 5832, 6859, 8000, 9261.
A perfect cube is a number which is the cube of an integer.Some examples include:0, 1, 8, 27, 64, 125, 216, 343, 512, 729, 1000, 1331, 1728, 2197, 2744, 3375, 4096, 4913, 5832, 6859, 8000, 9261, 10648, 12167, 13824, 15625, 17576, 19683, 21952, 24389, 27000, 29791, 32768, 35937, 39304, 42875, 46656, 50653, 54872, 59319, 64000, 68921, 74088, 79507, 85184, 91125, 97336, 103823, 110592, 117649, 125000, 132651, 140608, 148877, 157464, 166375, 175616, 185193, 195112, 205379, 216000, 226981, 238328...
9
15*15*15 = 3375 cubic inches.
It will be 3375 cubic inches.
153 = 3375 cubic units
the side length is 15 inches.side length:= cube root of 3375 in3= 15check:volume of cube = s3 = 153 or 15 *15*15 = 3375
The length is 15. The width and height are the same.
3375 in3
15 m
3375 cubic meters
15 cm
Each side of the cube would be 15cm in length.
15*15*15 = 3375 cubic mm = 0.003375 litres
As the volume of a mass of water depends upon its density and its density depends upon its purity, temperature (and pressure) and state, there is more than one answer - there are infinitely many possible answers.volume = mass/densityside length = ³√volumeAssuming pure water, some examples:At 0°C, density ≈ 999.8 kg/m³ → side length = ³√(3375 kg / 999.8 kg/m³) ≈ 1.5001 mAt 4°C, density = 1000 kg/m³ → side length = ³√(3375 kg / 1000 kg/m³) = 1.5 mAt 20°C, density ≈ 998.2 kg/m³ → side length = ³√(3375 kg / 998.2 kg/m³) ≈ 1.5009 mAt 50°C, density ≈ 988.1 kg/m³ → side length = ³√(3375 kg / 988.1 kg/m³) ≈ 1.5060 mAt 100°C in water form, density ≈ 958.4 kg/m³ → side length = ³√(3375 kg / 958.4 kg/m³) ≈ 1.5214 mAt 100°C in steam form at 1 bar, density ≈ 0.590 kg/m³ → side length = ³√(3375 kg / 0.590 kg/m³) ≈ 17.88 m