Respuesta :
Answer:
seed will = [tex]2075\frac{7}{10}[/tex] ft²
for high setting bag need 5 bags
for low setting bag need 7 bags
Step-by-step explanation:
given data
lawn length = [tex]40\frac{4}{5}[/tex] ft
lawn width = [tex]50\frac{7}{8}[/tex] ft
highest setting = 500 square feet
lowest setting = 300 square feet
to find out
how many square feet of seed will he need to cover the entire area and How many bags of seed will he need if he uses the highest setting and The lowest setting
solution
area = length × width ...............
area = [tex]40\frac{4}{5}[/tex] × [tex]50\frac{7}{8}[/tex]
area = [tex]\frac{204}{5}[/tex] × [tex]\frac{407}{8}[/tex]
area = [tex]\frac{204*407}{5*8}[/tex]
area = [tex]\frac{20757}{10}[/tex]
seed will = [tex]2075\frac{7}{10}[/tex] ft²
and
for high setting bag need
bag need = [tex]\frac{area}{high setting}[/tex]
bag need = [tex]\frac{2075}{500}[/tex]
bag need = [tex]4 \frac{3}{20}[/tex]
so here 4 bag is not sufficient so need 5 bags
and
for low setting
bag need = [tex]\frac{2075}{300}[/tex]
bag need = [tex]6 \frac{11}{12}[/tex]
so here 6 bag is not sufficient so need 7 bags
Answer:
a. He will need [tex]2,075.7\ ft^2[/tex] of seed to cover the entire area.
b. He will need 5 bags of seed if he uses the highest setting and 7 bags of seed if he uses the lowest setting.
Step-by-step explanation:
a. You can calculate the area of his lawn by multiplying its dimensions.
The dimensions are:
[tex]40\frac{4}{5}\ ft[/tex] by [tex]50\frac{7}{8}\ ft[/tex]
We can convert the mixed numbers to decimal numbers. To do this,we must divide the numerator by the denominator of the fraction and then we must add the quotient to the whole number part.
Then, these are:
[tex](40+0.8)\ ft=40.8\ ft[/tex]
[tex](50+0.875)\ ft=50.875\ ft[/tex]
Then:
[tex]Area=40.8\ ft*50.875\ ft\\\\Area=2,075.7\ ft^2[/tex]
He will need [tex]2,075.7\ ft^2[/tex] of seed to cover the entire area.
b. Let be "h" the number of bags of seed that he will need if he uses the highest setting.
You know that one bag of seed will cover 500 square feet if he uses the highest setting. Then:
[tex]h=\frac{2,075.7\ ft^2}{500\ ft^2}\\\\h=4.15\\\\h\approx5[/tex]
Let be "l" the number of bags of seed that he will need if he uses the lowest setting.
You know that one bag of seed will cover 300 square feet if he uses the lowest setting. Then:
[tex]l=\frac{2,075.7\ ft^2}{300\ ft^2}\\\\l=6.9\\\\l\approx7[/tex]
