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2.5:Optimization 2.6:Further optimization problems 2.7: Applications of calculus to business and economics
Math 16A (Autumn 2005)
Thomas Scanlon
University of California, Berkeley
Week 6
Thomas Scanlon University of California, Berkeley
Math 16A (Autumn 2005)
2.5:Optimization 2.6:Further optimization problems 2.7: Applications of calculus to business and economics
In many cases, one is interested in optimizing some quantity. In
most cases, this optimization corresponds to maximizing or
minimizing some function.
Thomas Scanlon University of California, Berkeley
Math 16A (Autumn 2005)
2.5:Optimization 2.6:Further optimization problems 2.7: Applications of calculus to business and economics
A mathematical example of minimization
Example
Find the value(s) of x minimizing the function
f (x) = x3 − x2 − x + 1 for x ≥ 0.
Thomas Scanlon University of California, Berkeley
Math 16A (Autumn 2005)
2.5:Optimization 2.6:Further optimization problems 2.7: Applications of calculus to business and economics
A solution
The minima (if they exist at all) are among the endpoints of the
domain and the solutions to f ′(x) = 0.
Wecompute the value of the function f(x) at the only endpoint,
x = 0 finding that f(0) = 1.
The first derivative is f ′(x) = 3x2 − 2x − 1 = (3x + 1)(x − 1)
which has roots −1
x = 3 and 1
As we are only interested in nonnegative values of x, we only
consider x = 1. Here, f (1) = 0.
As lim f(x) = ∞, we conclude that 1 is the absolute minimum.
x→∞
Thomas Scanlon University of California, Berkeley
Math 16A (Autumn 2005)
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