A rectangular park has an area of 1.36x10^8 ft^2. The length of the park is 1.6x10^4 ft. Divide the area by the length to find the width of the park.
To find the width of the park, we need to divide the area of the park by its length.
Area = 1.36x10^8 ft^2
Length = 1.6x10^4 ft
Width = Area / Length
Width = (1.36x10^8 ft^2) / (1.6x10^4 ft)
When dividing numbers in scientific notation, we subtract the exponents:
Width = 8.5x10^3 ft
Therefore, the width of the park is 8.5x10^3 ft.
To find the width of the park, you need to divide the area of the park by its length.
First, let's rewrite the area in standard notation. 1.36x10^8 ft^2 can be written as 136,000,000 ft^2.
Next, divide the area by the length to find the width:
Width = Area / Length
Width = 136,000,000 ft^2 / 1.6x10^4 ft
Now, let's simplify the calculation:
Width = 136,000,000 ft^2 / 16,000 ft
Width = 8,500 ft
Therefore, the width of the park is 8,500 ft.
To find the width of the park, we need to divide the area of the park by its length.
Given:
Area of the park = 1.36x10^8 ft^2
Length of the park = 1.6x10^4 ft
To find the width, we use the formula:
Width = Area / Length
Substituting the given values into the formula:
Width = 1.36x10^8 ft^2 / 1.6x10^4 ft
To divide these numbers, we can subtract their exponents:
Width = (1.36 / 1.6) x 10^(8-4) ft
Simplifying the division:
Width = 0.85 x 10^4 ft
The width of the park is 0.85x10^4 ft (or 8,500 ft).