when water freezes it its density drops from 1.00 g - 0.92 G find the mass in grams of an ice cube 1 meter on each Edge 1 m = 100 cm
mass=density*volume=.92g/cm^3 (100cm/m)^3*1m^3
mass=.92E6 grams
Sam cut the pie into 6 pieces
To find the mass of an ice cube with an edge length of 1 meter, we need to calculate the volume of the ice cube first.
The volume of a cube can be calculated using the formula:
Volume = edge length^3
In this case, the edge length is 1 meter, which is equal to 100 cm, so we need to convert it to centimeters before using the formula.
1 meter = 100 centimeters
Now, we can calculate the volume:
Volume = (100 cm)^3 = 100,000 cm^3
Since we know that the density of the ice cube is 0.92 g/cm^3, we can use the formula:
Mass = Density * Volume
Mass = 0.92 g/cm^3 * 100,000 cm^3 = 92,000 grams
Therefore, the mass of the ice cube is 92,000 grams.
To find the mass of an ice cube with an edge length of 1 meter, we need to calculate the volume of the ice cube first.
The volume of a cube is calculated by multiplying the length of one side cubed. In this case, the length of one side is 100 cm since 1 m equals 100 cm.
Volume of the ice cube = (100 cm)^3 = 100,000,000 cm^3
Next, we need to convert the volume from cm^3 to liters since density is typically measured in grams per milliliter (g/mL) or grams per cubic centimeter (g/cm^3).
To convert cm^3 to liters, divide the volume by 1000:
Volume in liters = 100,000,000 cm^3 / 1000 = 100,000 liters
Now, we can find the mass of the ice cube using the given density change. The difference in density, from 1.00 g/cm^3 to 0.92 g/cm^3, is a decrease of 0.08 g/cm^3.
Mass of the ice cube = Volume × Density = 100,000 liters × 0.08 g/cm^3 = 8,000 grams
Therefore, the mass of the ice cube is 8,000 grams.