Cubic centimeters (cc or cm³) and liters are two commonly used units for volume measurements, especially in fields like science, engineering, and daily life activities. While cubic centimeters are often used for measuring smaller volumes, liters are more commonly used for larger quantities, particularly in liquid measurements.
Cubic centimeters to liters conversion is very useful in many mathematical exercises and when dealing with different systems of measurement.
Generally, while solving some problems, we need to convert units.
Example: you are asked to find the volume of a cubical container in liters, and its side length is given in inches. So, after calculating the volume of the container, we have to convert the obtained volume in cubic inches to liters.
Before converting one unit to the other, we need to understand the relationship between the units. In this article, we will discuss the conversion of cubic centimeters to liters.
Cubic Centimeters (cc or cm3)
A cubic centimeter is an SI-derived unit of measurement of volume, which is also represented as cm3 or cc. It is the volume of a cube with measurements of one centimeter long, one centimeter wide, and one centimeter deep. One cubic centimeter is equal to 0.001L, 1 milliliter, 0.06102375 cubic inches, 0.00003531 cubic feet, 0.00000131 cubic yards, 0.00000629 oil barrels, 0.00026417 US gallons, and 0.00211338 US pints.
Liters (L)
Liter is a metric unit of volume denoted by the letter L. It is a non-SI unit but is accepted for use with the International System of Units (SI). The volume of a cube that is 10 cm long, 10 cm wide, and 10 cm deep occupies a volume of one liter. One kilogram of water weighs the same as one liter of water. One liter is equal to 1 dm3, 1000 cc, 0.001 cubic meters, 0.035314 cubic feet, 61.023744 cubic inches, 0.264172 US liquid gallons, and 1.75975399 imperial pints. Convert l to ml with out simple litre to milliliter calculator.
How to Convert Cubic Centimeters to Liters (cc to L)?
The value of 1 cubic centimeter is equal to 0.001 liters or 1 milliliters. To convert cubic centimeters to liters, we have to multiply the given value of cubic centimeters by a factor of 0.001. For example, 10 cubic centimeters are converted into liters as 10 × 0.001 L = 0.01 L.
1 cubic centimeter = 0.001 L
n × 1 cubic centimeters = n × 0.001 L
Conversion Table cc (cm3) to L
| Cubic Centimeter | Liter |
|---|---|
| 0.1 | 0.0001 |
| 1 | 0.001 |
| 2 | 0.002 |
| 3 | 0.003 |
| 4 | 0.004 |
| 5 | 0.005 |
| 10 | 0.01 |
| 20 | 0.02 |
| 50 | 0.05 |
| 100 | 0.1 |
| 1000 | 1 |
Related Resources
Solved Examples on Cubic Centimeters to Liter
Example 1: Convert 178 cubic centimeters to liters.
Solution:
We know that,
1 cubic centimeter = 0.001 L
Therefore,
178 cubic centimeters = 178 × 0.001 L
178 cm3 = 0.178 L
Therefore, the value of 178 cubic centimeters is equal to 0.178 L.
Example 2: Convert 139 cubic centimeters to liters.
Solution:
We know that,
1 cubic centimeter = 0.001 L
Therefore,
139 cubic centimeters = 139 × 0.001 L
139 cm3 = 0.139 L
Therefore, the value of 139 cubic centimeters is equal to 0.139 L.
Example 3: Convert 67 cubic centimeters to liters.
Solution:
We know that,
1 cubic centimeter = 0.001 L
Therefore,
67 cubic centimeters = 67 × 0.001 L
67 cm3 = 0.067 L
Therefore, the value of 67 cubic centimeters is equal to 0.067 L.
Example 4: Convert 1024 cubic centimeters to liters.
Solution:
We know that,
1 cubic centimeter = 0.001 L
Therefore,
1024 cubic centimeters = 1024 × 0.001 L
1024 cm3 = 1.024 L
Therefore, the value of 1024 cubic centimeters is equal to 1.024 L.
Example 5: Convert 256 cubic centimeters to liters.
Solution:
We know that,
1 cubic centimeter = 0.001 L
Therefore,
256 cubic centimeters = 256 × 0.001 L
256 cm3 = 0.256 L
Therefore, the value of 256 cubic centimeters is equal to 0.256 L.
Conclusion
Cubic centimeters to liters conversion is crucial for accurate volume measurements across various fields, from scientific research to everyday tasks. By recognizing that 1 cubic centimeter equals 0.001 liters, you can easily switch between these units depending on the scale of the volume you're working with. Whether you're calculating the volume of a container, a liquid, or any three-dimensional object, mastering this conversion ensures precision and consistency in your measurements.