Mr kurdzo wants to store a 12 foot long pipe in a tool closet that is 6 feet wide 6 feet wide and 8 feet high. Will it fit
Let's find the length it would take if placed diagonally.
Pythagoras:
a^2 + b^2 = c^2
6^2 + 8^2 = c^2
36 + 64 = c^2
100 = c^2
10 = c
To find out if the 12-foot-long pipe will fit in the tool closet, we need to compare its dimensions with the dimensions of the closet.
The pipe's length: 12 feet
The closet's width: 6 feet
The closet's height: 8 feet
Since the pipe's length exceeds the width of the closet, we need to check if it can fit in terms of height.
The pipe's length: 12 feet
The closet's height: 8 feet
To fit the entire pipe, the pipe's length needs to be less than or equal to the closet's height. In this case, the 12-foot-long pipe will fit into the 8-foot-high closet.
To determine if the 12-foot long pipe will fit in the 6 feet wide, 6 feet deep, and 8 feet high tool closet, we need to compare the dimensions of the pipe with the available space in the closet.
The length of the pipe is 12 feet, which means it extends along the longest side. Therefore, we need to check if this length can fit within the width of the closet.
Since the width of the closet is 6 feet, and the pipe length is also 6 feet, we can conclude that the pipe will fit within this dimension.
Next, we need to make sure that the height of the closet is sufficient to accommodate the pipe. The height of the closet is 8 feet, which is greater than the length of the pipe (12 feet). So, the pipe will fit in terms of height as well.
Finally, we need to assess whether the depth of the closet is suitable for the pipe. The depth of the closet is also 6 feet, which is equal to the length of the pipe. Therefore, the pipe will fit within this dimension as well.
In summary, based on the given dimensions of the pipe and the tool closet, the 12-foot long pipe will fit inside the closet without any issues.