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Math 241: Multivariable calculus
Professor Leininger
www.math.uiuc.edu/∼clein/classes/2014/fall/241.html
Fall 2014
www.math.uiuc.edu/∼clein/classes/2014/fall/241.html
Calculus of 1 variable
In Calculus I and II you study real valued functions
y = f(x)
of a single real variable.
Examples:
• f (x) = x2, r(x) = 2x2+x , h(θ) = sin(θ) + cos(2θ),
x3−5x+20
g(u) = eu,...
• T(t) = temperature in Champaign-Urbana, t hours after
midnight on August 25.
• ρ(d) = density of a piece of wire at distance d from one end.
www.math.uiuc.edu/∼clein/classes/2014/fall/241.html
Three key concepts from Calculus I, II.
f (x), a function of one variable.
1. The derivative: f ′(x) = df = d f (x) = dy.
dx dx dx
• Rate of change.
• Slope of the tangent line to the graph.
2. The integral: Rb f (x)dx.
a
• Signed area under graph.
• Average value 1 Rbf(x)dx.
b−a a
3. Fundamental Theorem of Calculus: Relates the two.
• f(b)−f(a) = Rbf′(x)dx.
a
www.math.uiuc.edu/∼clein/classes/2014/fall/241.html
1 variable is too constrained
Functions of a single variable are insufficient for modeling more
complicated situations.
Examples:
• The temperature depends on location as well as time. Need
to specify location, e.g. by latitude x and longitude y, and
time, e.g. t hours after midnight:
T(x,y,t) = temperature at time t in location (x,y).
• Density of a flat sheet of metal can depends on the point in
the sheet, specified by x and y coordinates
δ(x,y) = density of point at (x,y) in a sheet of metal
www.math.uiuc.edu/∼clein/classes/2014/fall/241.html
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