Problem #1: [35 pts] Profit calculation for an Avocado farm Write a program that helps a farmer predict his profit by planting Avocado trees in his land. The farmer is required to enter the dimensions of his land in meters (rectangular land with a width and length) and the number of years of prediction. Then, the program will tell him how many trees to plant and a profit prediction over the specified number of years. Write a program that does this job by knowing the following: The area of a rectangular shape is: Area = Length x Width. • Each Avocado tree needs 36 m of space. • The price of an Avocado tree is 10 $ The price of 1 kg of Avocado fruit is 3 $ An Avocado tree starts yielding fruits on the third year (no yield in the first two years), it yields an average of 7 kg per year. Then, each year it yields 6 times the previous year's yield. Example: if the third year's yield is 7 kg, then the fourth year's yield is 6 x 7 = 42 kg. The cost of farming (Workers, water, etc....) per year is 0.15 $ for each I m2

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Sample run 1
Enter length & width of your land and the # of years: 100 400 4
Land size = 40000
You need 1111 trees that cost 11110 $
Earning per year:
year 1 and 2:
Yield: 0 kg
Earning: 0 $
year 3:
Yield: 7 kg per tree
Earning: 23331 $
year 4:
Yield: 42 kg per tree
Earning: 139986 $
Total profit = 128207 $
Sample run 2
Enter length & width of your land and the
# of years: -100 200 8
Numbers must be positives
Sample run 3
Enter length & width of your land and the # of years: 100 400 7
Land size = 40000
You need 1111 trees that cost 11110 $
Earning per year:
year 1 and 2:
Yield: 0 kg
Earning: 0 $
year 3:
Yield: 7 kg per tree
Earning: 23331 $
year 4:
Yield: 42 kg per tree
Earning: 139986 $
year 5:
Yield: 252 kg per tree
Earning: 839916 $
year 6:
Yield: 1512 kg per tree
Earning: 5039496 $
year 7:
Yield: 9072 kg per tree
Earning: 30236976 $
Total profit = 36226595 $
Transcribed Image Text:Sample run 1 Enter length & width of your land and the # of years: 100 400 4 Land size = 40000 You need 1111 trees that cost 11110 $ Earning per year: year 1 and 2: Yield: 0 kg Earning: 0 $ year 3: Yield: 7 kg per tree Earning: 23331 $ year 4: Yield: 42 kg per tree Earning: 139986 $ Total profit = 128207 $ Sample run 2 Enter length & width of your land and the # of years: -100 200 8 Numbers must be positives Sample run 3 Enter length & width of your land and the # of years: 100 400 7 Land size = 40000 You need 1111 trees that cost 11110 $ Earning per year: year 1 and 2: Yield: 0 kg Earning: 0 $ year 3: Yield: 7 kg per tree Earning: 23331 $ year 4: Yield: 42 kg per tree Earning: 139986 $ year 5: Yield: 252 kg per tree Earning: 839916 $ year 6: Yield: 1512 kg per tree Earning: 5039496 $ year 7: Yield: 9072 kg per tree Earning: 30236976 $ Total profit = 36226595 $
PART 2
Problem #1: [35 pts] Profit calculation for an Avocado farm
Write a program that helps a farmer predict his profit by planting Avocado trees in his land. The farmer is
required to enter the dimensions of his land in meters (rectangular land with a width and length) and the
number of years of prediction. Then, the program will tell him how many trees to plant and a profit
prediction over the specified number of years. Write a program that does this job by knowing the following:
The area of a rectangular shape is: Area = Length x Width.
Each Avocado tree needs 36 m² of space.
The price of an Avocado tree is 10 $
The price of 1 kg of Avocado fruit is 3 $
An Avocado tree starts yielding fruits on the third year (no yield in the first two years), it yields an
average of 7 kg per year. Then, each year it yields 6 times the previous year's yield. Example: if the
third year's yield is 7 kg, then the fourth year's yield is 6 x 7 = 42 kg.
The cost of farming (Workers, water, etc....) per year is 0.15 $ for each I m²
Example:
= 100 m
= 400 m
Land width
Land length
Number of years
= 7 years
The area of land
= 400 x 100 = 40000 m²
= 40000/36 = 1111 trees
= 1111 x 10$ = 11110 $ (this is a one-time payment)
= 0.15 x 40000 = 6000 $ (for the entire land)
Number of trees to buy
Cost of all trees
Cost of farming per year
Yield calculation:
Yield of 1 tree in kg
Earning from the entire land
O$
7 kg x 3 $ x 1111 trees = 23331 $
42 kg x 3 $ x 1111 trees = 139986 $
252 kg x 3 $ x 1111 trees = 839916 $
1512 kg x 3 $ x 1111 trees = 5039496$
9072kg x 3 $ x 1111 trees = 30236976$
Year
1 and 2
3
4
7 x 6 = 42
5
42 x 6 = 252
6
252 x 6 = 1512
1512 x 6 = 9072
Total profit = Total earning
= (23331 + 139986 + 839916 + 5039496 + 30236976)
= 36279705 $
= 36279705 $
= 36226595 $
(Yearly payment + cost of all trees)
(7x6000 + 11110)
(42000 + 11110)
(53110)
Transcribed Image Text:PART 2 Problem #1: [35 pts] Profit calculation for an Avocado farm Write a program that helps a farmer predict his profit by planting Avocado trees in his land. The farmer is required to enter the dimensions of his land in meters (rectangular land with a width and length) and the number of years of prediction. Then, the program will tell him how many trees to plant and a profit prediction over the specified number of years. Write a program that does this job by knowing the following: The area of a rectangular shape is: Area = Length x Width. Each Avocado tree needs 36 m² of space. The price of an Avocado tree is 10 $ The price of 1 kg of Avocado fruit is 3 $ An Avocado tree starts yielding fruits on the third year (no yield in the first two years), it yields an average of 7 kg per year. Then, each year it yields 6 times the previous year's yield. Example: if the third year's yield is 7 kg, then the fourth year's yield is 6 x 7 = 42 kg. The cost of farming (Workers, water, etc....) per year is 0.15 $ for each I m² Example: = 100 m = 400 m Land width Land length Number of years = 7 years The area of land = 400 x 100 = 40000 m² = 40000/36 = 1111 trees = 1111 x 10$ = 11110 $ (this is a one-time payment) = 0.15 x 40000 = 6000 $ (for the entire land) Number of trees to buy Cost of all trees Cost of farming per year Yield calculation: Yield of 1 tree in kg Earning from the entire land O$ 7 kg x 3 $ x 1111 trees = 23331 $ 42 kg x 3 $ x 1111 trees = 139986 $ 252 kg x 3 $ x 1111 trees = 839916 $ 1512 kg x 3 $ x 1111 trees = 5039496$ 9072kg x 3 $ x 1111 trees = 30236976$ Year 1 and 2 3 4 7 x 6 = 42 5 42 x 6 = 252 6 252 x 6 = 1512 1512 x 6 = 9072 Total profit = Total earning = (23331 + 139986 + 839916 + 5039496 + 30236976) = 36279705 $ = 36279705 $ = 36226595 $ (Yearly payment + cost of all trees) (7x6000 + 11110) (42000 + 11110) (53110)
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