# Feet to Meters Conversion – Formula, Examples, Practice Problems

## What Is Feet to Meters Conversion?

Feet to meters conversion is the process of converting measurements of length or distance from feet to meters.

1 foot to meter conversion is given by 1 foot = 0.3048 m. One foot is equal to 0.3048 meters, making the meter a larger unit.

1 foot = 0.3048 meters

1 meter = 3.2048 feet

To convert feet to meters, you multiply the length in feet by the conversion factor 0.3048.

Meter (m) is an SI unit of length in the metric system and is internationally accepted. Feet (ft, symbol: ’) is the customary unit of length. Feet to meters conversion aids in converting and comparing the length given in the two units.

## Feet to Meters Converter

To perform the conversion instantly, check out the feet to meters converter

Step 1: Set the converter from “Feet” to “Meters” format.

Step 2: Write the value of feet to be converted into meters.

Step 3: Click on “Convert” to get the value in meters.

Step 4: Go on to check different values.  Reset to get the blank converter. Click on swap to switch the converter for the meter to feet conversion.

## Feet to Meters Conversion Formula

The feet to meters conversion formula is derived based on the conversion, i.e., 1 foot = 0.3048 meters. For the given number (n) units of feet measurement, we must multiply the given number by 0.3048 to get the measurement value in meters. Mathematically, it can be expressed as:

n feet = n $\times$ 0.3048 meters

where n is the given measurement in feet.

## Feet to Meters Conversion Table

Here is a table representing the feet and meter form of a few numbers:

## How to Convert Feet to Meters

The feet to meters conversion can be performed manually or through an online conversion tool. To manually convert feet to meters, we must follow the mentioned steps.

Step 1: Check thoroughly the unit asked in the given problem.

Step 2: Use the following formula to perform the conversion if it is in feet.

n feet = n $\times$ 0.3048 meters

Step 3: Put the value in feet in the place of n and perform multiplication accurately.

Step 4: Obtain and write the value in meters. Round off the number as per the requirement or represent it in meters and centimeters.

## Facts about Feet to Meters Conversion

• The feet to meters conversion formula is widely used in several fields like architecture, astronomy, international trading, construction, engineering and many more.
• Dual label signs on the products have been used to cater to the people using distinct measurements. For example, to observe an average person’s height, we use 5 feet 7 inches (5’7”).
• We require software-based systems or online conversion tools for satellite-based systems, surveys, and navigation to have accuracy in the results of complex data.
• Flight altitude in aviation is generally represented in feet.

## Conclusion

In this article, we learned about feet to meters conversion, a crucial process for transforming length measurements between imperial and metric systems. Understanding this conversion is vital for international communication and various industries like construction and engineering. To reinforce our knowledge, let’s solve a few examples and practice MCQs for better comprehension. Happy converting!

## Solved Examples on Feet to Meters Conversion

Example 1: The length of a cloth is 12 ft. Calculate the length in meters.

Solution:

Length of a cloth (n) = 12 ft

Using the feet to meters formula, we get

n feet = n $\times$ 0.3048 meters

Now, substituting the value n at its corresponding position, we get

12 feet =12 $\times$ 0.3048

12 feet =3.6576

Therefore, the length of 12 feet cloth = 3.6576 meters.

Example 2: Calculate the area in square meters if the length and breadths of a rectangle are $14 ft$\times$12 ft. Round off the answer to two decimals. Solution: Length of a rectangle = 14 ft Breadth of a rectangle = 12 ft First, we must convert the length and breadth in meters. Using the formula for feet to meters conversion n feet = n$\times$0.3048 meters Length = 14$\times$0.3048 = 4.2672 meters Breadth = 12$\times$0.3048 = 3.6576 meters The formula for the area of rectangle = length$\times$breadth Area = 4.2672$\times$3.6576 Area = 15.6077 square meters Therefore, the area of the rectangle is 15.60 square meters (rounded to two decimals). Example 3: The length and breadth of a box are 20 meters and 12 meters. What is its length and breadth in feet? Round off the answers to two decimals. Solution: Length of a box = 20 meters Breadth of a box = 12 meters Using the conversion formula 1 meter = 3.2048 feet Length = 20$\times$3.2048 Length = 64.096 feet Breadth = 12$\times$3.2048 Breadth = 38.4576 feet Therefore, the length and breadth of the box are 64.10 feet and 38.50 feet (Round off to two decimals). Example 4: If the dimensions of a bed are 15 ft$\times$10 ft. Find the area in square meters. Solution: Since length is always greater than the breath in a rectangle Length of a bed = 15 ft Breadth of a bed = 10 ft Using the ft to meters conversion formula, we get n feet = n$\times$0.3048 meters Length = 15$\times$0.3048 = 4.572 meters Breadth =10$\times$0.3048 = 3.048 meters Therefore, the bed’s length and breadth are 4.572 meters and 3.048 meters. Area of rectangle = length$\times$breadth Area = 4.572$\times$3.048 Area = 13.935 m2 Thus, the area of the bed is 13.935 square meters. Solution 5: If the length and breadth of a rectangular ground are 11,100 feet and 10,000 feet. Calculate its length and breadth in meters. Solution: Length = 11,100 feet Breadth = 10,000 feet Using the feet to meters equation, we get n feet = n$\times$0.3048 meters Length =11,100$\times$0.3048 Length = 3383.28 meters Breadth = 10,000$\times$0.3048 Breadth = 3048 meters Therefore, the length and breadth of the house are 3383.28 meters and 3048 meters. ## Practice Problems on Feet to Meters Conversion 1 ### The length of a rectangle is 4 feet. What is its length in meters? 1.2192 meters 2.3456 meters 1.4345 meters 2.1234 meters CorrectIncorrect Correct answer is: 1.2192 meters Using the feet to meters conversion formula n feet = n$\times$0.3048 meters 4$\times$0.3048 =1.2192 Therefore, the length of a rectangle is 1.2192 meters. 2 ### 100 feet = ____meters 30.48 0.3048 304.8 0.003048 CorrectIncorrect Correct answer is: 30.48 Using the feet to meters conversion formula, we get n feet = n$\times$0.3048 meters 100 feet = 100$\times$0.3048 meters 100 feet = 30.48 meters 3 ### 60 feet _____ 20 meters$\lt\gt=\approx$CorrectIncorrect Correct answer is:$\lt$60 feet = 60$\times$0.3048 meters = 18.288 meters 18.288 meters$\lt$20 meters Thus, 60 feet$\lt$20 meters 4 ### 14 feet = ______ meters. 2.34 3.45 2.31 4.27 CorrectIncorrect Correct answer is: 4.27 Using the feet to meter conversion formula Using the feet to meters conversion formula n feet =$n \times$0.3048 meters 14 feet = 14$\times\$ 0.3048 meters
14 feet = 4.2672 meters
Round off to two decimal places. The answer would be 4.27.