The goal of this problem is to find the maximum area of a rectangle whose lower-left vertex is at the origin and whose upper-right vertex is on the curve g(x) = V38- x. (d) The width of the rectangle with the maximum area is w = |. Enter an exact number only. (e) The maximum possible area of such a rectangle is number only. Enter an exact For this problem, let w denote the (horizontal) width of the rectangle and let h be the (vertical) height of the rectangle. See the figure below.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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The goal of this problem is to find the maximum area of a rectangle whose
lower-left vertex is at the origin and whose upper-right vertex is on the
curve g(x) = V38 – x.
(d) The width of the rectangle with the maximum area is w =
Enter an
exact number only.
Enter an exact
(e) The maximum possible area of such a rectangle is
number only.
For this problem, let w denote the (horizontal) width of the rectangle and
let h be the (vertical) height of the rectangle. See the figure below.
Transcribed Image Text:The goal of this problem is to find the maximum area of a rectangle whose lower-left vertex is at the origin and whose upper-right vertex is on the curve g(x) = V38 – x. (d) The width of the rectangle with the maximum area is w = Enter an exact number only. Enter an exact (e) The maximum possible area of such a rectangle is number only. For this problem, let w denote the (horizontal) width of the rectangle and let h be the (vertical) height of the rectangle. See the figure below.
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