To determine the density of the object, we can use the formula: Density = Mass / Volume. Plugging in the values given, Density = 27g / 10cm^3 = 2.7 g/cm^3. Therefore, the object has a density of 2.7 g/cm^3.
1.9 cm cannot describe a mass. A mass must be 3-dimesional object, 1.9 cm givs the measure of only 1-dimension.
A meter stick of course!
Which dimensions are which? For a base of 2 cm, height of 3 cm, and length of 2 cm it would be 5 cm^3. It would be the same if the base were 3 cm, but if the length were 3 cm it would instead be 6 cm^3.
The same object that is 11.5 cm long
To find the density of object B, calculate its volume first: 10 cm (length) * 5 cm (width) * 2 cm (height) = 100 cm^3. Then, divide the mass by the volume: 300g / 100 cm^3 = 3 g/cm^3. The density of object B is 3 g/cm^3.
5.86 g/cm^3 615 g / 105 cm^3 = 5.86 g/cm^3
The density of the object is 0.2 g/cm^3. This is calculated by dividing the mass (10g) by the volume (50 cm^3).
The density of the object can be calculated using the formula: Density = Mass/Volume. Plugging in the values, Density = 30 grams / 10 cm^3 = 3 grams/cm^3. Therefore, the density of the object is 3 grams/cm^3.
It is: 2*3*10 = 60 cubic cm
The density of the object can be calculated by dividing its mass by its volume. In this case, the density would be 85 g / 92 cm^3 = 0.92 g/cm^3.
The density of the object is calculated by dividing the mass (184g) by the volume (50 cm^3). Therefore, the density of the object is 3.68 g/cm^3.
The volume of the object can be calculated by dividing the mass by the density. So, V = m/d = 50g / 15g/cm^3 = 3.33 cm^3. Thus, the volume of the object is 3.33 cm^3.
the density of an object that is 10 cm by 2 cm and has a mass 400g will be 10000 Kg m-3. This can be calculated by the formula, density = mass/volume
we know, volume of object cuboid = l * b* h volume = 20 * 5*2= 200 cm ^3
The density of the object can be calculated by dividing the mass by the volume. In this case, the density would be 0.32 g/cm^3 (8.0 g / 25 cm^3 = 0.32 g/cm^3).
The density of the object is 9 g/cm^3.