Suppose f(x, y)= g(x)h(y), where g and h are continuously differentiable functions of one variable with g(1) = 3, g'(1) =2, h(2) = 5, and h'(2) = -1. Use linearization to approximate ƒ(1.1, 2.2).

Calculus: Early Transcendentals
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Chapter1: Functions And Models
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Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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Suppose f(x, y) g(x)h(y), where g and h are continuously differentiable
functions of one variable with
g(1) = 3, g'(1) =2, h(2) = 5, and h'(2) =-1.
Use linearization to approximate f(1.1, 2.2).
Transcribed Image Text:Suppose f(x, y) g(x)h(y), where g and h are continuously differentiable functions of one variable with g(1) = 3, g'(1) =2, h(2) = 5, and h'(2) =-1. Use linearization to approximate f(1.1, 2.2).
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