Okay, let's break this down step-by-step:
(a) The vacant lot has a frontage of 130 ft. So the x-axis ranges from 0 to 130 ft.
(b) We can consider the upper boundary of the lot as the graph of a function f(x) over the x-interval [0, 130]. So the area of the lot is the integral:
A = ∫0^\130 f(x) dx
(c) We divide [0, 130] into 5 equal subintervals of length 26 ft. So: 0-26 ft, 26-52 ft, 52-78 ft, 78-104 ft, 104-130 ft.
(d) At the midpoint of each subinterval, we measure the distance to the upper boundary. These are:
f(13) = ?
f(39) = ?
f(65) = ?
f(91) = ?
f(117) = ?
(e) To approximate the area using rectangles, we do:
A ≈ (f(13) - 0) * 26 + (f(39) - f(13)) * 26 +
(f(65) - f(39)) * 26 + (f(91) - f(65)) * 26 +
(f(117) - f(91)) * 26 + (130 - f(117)) * 26
(f) If we don't know the actual values of f(x) at the midpoints, we can estimate them. Let's say:
f(13) ≈ 15
f(39) ≈ 35
f(65) ≈ 55
f(91) ≈ 75
f(117) ≈ 95
(g) Plugging these in:
A ≈ (15 - 0) * 26 + (35 - 15) * 26 +
(55 - 35) * 26 + (75 - 55) * 26 +
(95 - 75) * 26 + (130 - 95) * 26 = 33,750 square ft
So the approximate area of the vacant lot is 33,750 square ft.
Please let me know if you have any other questions!