Textbook Question
Optimal soda can
a. Classical problem Find the radius and height of a cylindrical soda can with a volume of 354 cm³ that minimize the surface area.
5. Graphical Applications of Derivatives
Applied Optimization
5:31 minutesProblem 4.5.42
Textbook Question
Light transmission A window consists of a rectangular pane of clear glass surmounted by a semicircular pane of tinted glass. The clear glass transmits twice as much light per unit of surface area as the tinted glass. Of all such windows with a fixed perimeter P, what are the dimensions of the window that transmits the most light?
Verified step by step guidance1
Define the variables: Let the width of the rectangular pane be \( w \) and the height be \( h \). The radius of the semicircular pane is \( r \). The perimeter constraint is given by the equation \( 2h + 2w + \pi r = P \).
Express the area of the window: The area of the rectangular pane is \( A_{rect} = w \times h \) and the area of the semicircular pane is \( A_{semi} = \frac{1}{2} \pi r^2 \). The total area is \( A_{total} = wh + \frac{1}{2} \pi r^2 \).
Set up the light transmission function: Since the clear glass transmits twice as much light as the tinted glass, the light transmitted is \( L = 2wh + \frac{1}{2} \pi r^2 \).
Use the perimeter constraint to express one variable in terms of the others: Solve \( 2h + 2w + \pi r = P \) for one of the variables, for example, \( h = \frac{P - 2w - \pi r}{2} \). Substitute this into the light transmission function.
Optimize the light transmission function: Differentiate the light transmission function with respect to the remaining variables and set the derivatives to zero to find critical points. Use the second derivative test or other methods to determine which dimensions maximize the light transmission.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Optimization
Optimization in calculus involves finding the maximum or minimum values of a function. In this context, we need to determine the dimensions of the window that maximize light transmission, which requires setting up a function that represents the total light transmitted and then using techniques such as derivatives to find critical points.
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Perimeter Constraint
The perimeter constraint is a fixed condition that limits the dimensions of the window. For this problem, the total perimeter of the rectangular and semicircular panes must equal a given value P, which introduces a relationship between the width and height of the window that must be considered when optimizing light transmission.
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Area and Light Transmission
The area of each pane of glass contributes to the total light transmitted, with the clear glass transmitting twice as much light per unit area as the tinted glass. Understanding how to calculate the areas of the rectangular and semicircular sections and their respective contributions to light transmission is crucial for formulating the optimization problem.
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