Asked by Kathy
To make an enclosure for chickens, a rectangular area will be fenced next to a house. Only 3 sides will need to be fenced. There is 120 ft. of fencing material.
a. What quadratic function represents the area of the rectangular enclosure, where x is the distance from the house?
b. what dimensions will maximize the area of the enclosure?
a. What quadratic function represents the area of the rectangular enclosure, where x is the distance from the house?
b. what dimensions will maximize the area of the enclosure?
Answers
Answered by
Reiny
Let the length parallel to the house be y
let each of the other two equal sides be x
2x + y = 120
y = 120 - 2x
Area = xy
= x(120 - 2x) or -2x^2 + 120x
b) you want the vertex.
x of the vertex is -120/(-4) = 30
when x = 30
y = 60
Maximum area = xy = 1800 ft^2
let each of the other two equal sides be x
2x + y = 120
y = 120 - 2x
Area = xy
= x(120 - 2x) or -2x^2 + 120x
b) you want the vertex.
x of the vertex is -120/(-4) = 30
when x = 30
y = 60
Maximum area = xy = 1800 ft^2
Answered by
Anonymous
Roller coaster that has uphill climb of 255 feet at an angle of 38 degrees on its largest hill
Answered by
Just k
a. -2x²+120x
b. max area= 1800ft²
b. max area= 1800ft²
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.