Answer:
The total length of fencing needed to enclose the kennel 74 feet.
Step-by-step explanation:
Given:
The blueprint of the rectangular kennel shows one side is 23 feet and another side is 14 feet.
As it is a rectangular shape, let the two sides be the length and the breadth of the rectangular kennel. i.e
[tex]length = L = 23\ feet\\breadth = B = 14\ feet\\[/tex]
To find:
Total length of fencing needed is to enclose the kennel. i.e
Perimeter of a rectangular kennel = ?
Solution:
we have the formula for perimeter of a rectangle as giving below.
[tex]\textrm{perimeter of rectangle} = 2(length + breadth) \\\textrm{total length of fencing} = 2( L+B)\\ \textrm{substituting the values of length and breadth we get}\\ \textrm{total length of fencing} = 2(23+14)\\=2\times37\\= 74\ feet[/tex]
Therefore,the total length of fencing needed to enclose the kennel 74 feet.
The total length of fencing needed to enclose the kennel is 74 feet.
Perimeter is the total length about a two dimensional shape or figure. The perimeter of a rectangle is given by:
Perimeter = 2(length + width)
Given that length = 23 feet, width = 14 feet, hence:
Perimeter = 2(23 + 14) = 74 feet
The total length of fencing needed to enclose the kennel is 74 feet.
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