Answer:
32 meters
Step-by-step explanation:
If there are 7 trees in a row and the distance from the first tree to the last tree is 48 meters, we can use this information to find the distance from the first tree to the fifth tree.
Let's denote the distance between consecutive trees as [tex](d)[/tex].
Since there are 6 intervals between 7 trees, the total distance between the first and the last tree is the sum of these intervals:
[tex] \textsf{Total distance} = 6d [/tex]
Given that the total distance is 48 meters, we can set up the equation:
[tex] 6d = 48 [/tex]
Now, solve for [tex]d[/tex]:
[tex] d = \dfrac{48}{6} [/tex]
[tex] d = 8 [/tex]
So, the distance between consecutive trees is 8 meters.
To find the distance from the first tree to the fifth tree, we need to consider the four intervals between them. The distance is:
[tex] \textsf{Distance to the fifth tree} = 4d [/tex]
[tex] \textsf{Distance to the fifth tree} = 4 \times 8 [/tex]
[tex] \textsf{Distance to the fifth tree} = 32 [/tex]
Therefore, the distance from the first tree to the fifth tree is 32 meters.
