To convert 60 cm to inches, you can use the following step-by-step instructions:
Step 1: Understand the conversion factor.
– 1 inch is equal to 2.54 centimeters.
Step 2: Set up the conversion equation.
– 1 inch = 2.54 cm
Step 3: Set up the conversion factor.
– Divide both sides of the equation by 2.54 cm to get the conversion factor: 1 inch / 2.54 cm.
Step 4: Multiply the value by the conversion factor.
– Multiply 60 cm by the conversion factor: 60 cm * (1 inch / 2.54 cm).
Step 5: Simplify the equation.
– The cm unit cancels out, leaving you with the value in inches: 60 cm * (1 inch / 2.54) = 23.62 inches.
Therefore, 60 cm is equal to 23.62 inches.
Real-life example:
Let’s say you have a ruler that measures in centimeters, and you want to know the equivalent length in inches. You measure an object and find it to be 60 cm long. To convert this measurement to inches, you can use the conversion factor of 1 inch = 2.54 cm. By multiplying 60 cm by the conversion factor, you find that the object is approximately 23.62 inches long.
FAQs:
Q: Why do we need to convert units?
A: Unit conversion is necessary when dealing with measurements in different systems or when communicating with people who use different units. It allows for consistency and understanding across different contexts.
Q: How do I convert centimeters to inches?
A: To convert centimeters to inches, you can use the conversion factor of 1 inch = 2.54 centimeters. Multiply the value in centimeters by this conversion factor to obtain the equivalent length in inches.
Q: Can I use an online converter instead of manual calculations?
A: Yes, there are numerous online unit converters available that can quickly and accurately convert between different units, including centimeters to inches. These converters are convenient and can save time.
Q: Are there other common conversion factors for centimeters to inches?
A: The conversion factor of 1 inch = 2.54 centimeters is the most commonly used and widely accepted. However, it is important to note that using different conversion factors may result in slightly different values, as they are based on rounding and approximation.