Linear Approximation, Gradient, and Directional Derivatives Summary Potential Test Questions from Sections 14.4 and 14.5 1. Write the linear approximation (aka, the tangent plane) for the given function at the given point: (a) f (x, y)= x 2 y 2 +1 at the point (4, 1) (b) g(x, y)= e x 2 +y at the point (0, 0)
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Linear Approximation, Gradient, and Directional Derivatives Summary
Potential Test Questions from Sections 14.4 and 14.5
1. Write the linear approximation (aka, the tangent plane) for the given function at the givenpoint:
(a) f(x, y) =x2
y2 + 1at the point (4, 1)
(b) g(x, y) = ex2+y at the point (0, 0)
2. Use your previous answers to give pencil-and-paper approximations for f(0.01,−0.02) andg(4.01, 0.98). Use a calculator to compare each answer to the actual value.
3. Use the Chain Rule to evaluated
dtf(c(t)) in each case below:
(a) f(x, y) = x2 − 3xy and c(t) = 〈cos t, sin t〉
(b) g(x, y, z) = xyz−1 and c(t) = 〈et, t, t2〉
4. In each of the following cases, calculate the derivative of the given function with respect to vand the directional derivative of f in the direction of v at the given point P .
(a) f(x, y) = x2y3, v = 〈1, 1〉, and P = (16, 3).
(b) g(x, y, z) = z2 − xy2, v = 〈−1, 2, 2〉, and P = (2, 1, 3)
5. Find the equation of the plane tangent to the surfce x2 + 3y2 + 4z2 = 20 at the point P =(2, 2, 1).
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