Answer:
The hose is ~70.71 ft long.
Step-by-step explanation:
We need to use Pythagorean theorem to figure this out. ( A^2 + B^2 = C^2)
So we first need to square 50 two times, since that's the length and height of the garden. This equals 5000.
Then we just need to find the root of 5000! This rounds out to about 70.71 ft.
Hope I could help! :)
The length of the hose which is stretched from one corner of the garden to another corner across the diagonal of it is 70.72 ft
The diagonal of the square is the distance from opposite vertices of it. There are two diagonals in a square which are equal in measure.
To find the diagonal of the square, the following formula is used.
d=a√2
Here, (a) is the length of the side of the square.
The side of a square garden is 50 ft long. One hose is stretch from one corner of the garden to another corner across the diagonal of it. Thus, the length of the diagonal is,
d=a√2
d=(50)√2
d=70.72 ft
Thus, the length of the hose which is stretched from one corner of the garden to another corner across the diagonal of it is 70.72 ft
Learn more about the diagonal of the square here;
https://brainly.com/question/12902617
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