The formula in order to obtain the area of the circular flower bed is given as
Area= (pi)(radius).^2
As given in the problem, radius is equal to 4 feet=4 ft., and the value of pi will be designated as 3.14.
using the formula, we compute for the area of the circular flower bed to be:
Area = (3.14)(4 ft)^2Area = (3.14)(16)
Area=50.24 ft^2
Hence, the area of the circular flower bed is 50.24 ft^2.
Answer:
We have to prove Δ ABO ≅ Δ CDO or, Δ DAO ≅ Δ BCO.
Step-by-step explanation:
Let us assume that ABCD is a parallelogram having diagonals AC and BD.
We have to prove that in a parallelogram the diagonals bisect each other.
Assume that the diagonals of ABCD i.e. AC and BD intersect at point O.
Therefore, to prove that the diagonals AC and BD bisect each other, we have to first prove that Δ ABO and Δ CDO are congruent or Δ DAO and Δ BCO are congruent.
In symbol, we have to prove Δ ABO ≅ Δ CDO or, Δ DAO ≅ Δ BCO. (Answer)
Each "contour" is a pair of parallel lines with slope 8.
The profit is going to be the total amount made, so you are going to subtract $350 - $45 = $305. $305. I hope this helps!
