A carpenter has a board that is 10 feet long. He wants to make 6 table legs that are all the same length. What is the longest each leg can be?
Please explain how you find a sum of this problem.
This is a division problem. Divide 10 by 6.
19/6 = 1 2/3
Now you can add 1 2/3 six times to get 10 feet.
738 long
To find the longest length of each leg, we need to divide the total length of the board by the number of legs.
Step 1: Find the total length of all the legs combined.
Since there are 6 legs in total, we need to find the sum of their lengths. This can be done by multiplying the number of legs (6) by the length of each leg: 6 * length of each leg.
Step 2: Divide the total length of the board by the number of legs to find the length of each leg.
Since we know the total length of all the legs combined, we can divide it by the number of legs to find the length of each leg. This can be done using the formula: Length of each leg = Total length of all legs combined / Number of legs.
In this case, the total length of the board is 10 feet, and we want to make 6 legs of equal length.
So, the Length of each leg = 10 feet / 6 legs ≈ 1.67 feet.
Therefore, the longest each leg can be is approximately 1.67 feet.
To find the longest length each leg can be, we need to divide the length of the board by the number of legs. In this case, the length of the board is 10 feet and the number of legs is 6.
To calculate the length of each leg, you can use the division operation. Dividing the length of the board by the number of legs can be expressed as:
10 feet ÷ 6 legs
By performing this operation, we can find the maximum length each leg can be. Let's do the calculation:
10 ÷ 6 = 1.6666666666666667
The result is approximately 1.67 feet.
Therefore, the longest length each leg can be is approximately 1.67 feet.