Mathematics, 16.10.2021 18:40, casaescuelarios
g EXAMPLE 5 If f(x, y, z) = x sin(yz), (a) find the gradient of f and (b) find the directional derivative of f at (4, 2, 0) in the direction of v = i + 4j β k. SOLUTION (a) The gradient of f is βf(x, y, z) = fx(x, y, z), fy(x, y, z), fz(x, y, z) EXAMPLE 5 If f(x, y, z) = x sin(yz), (a) find the gradient of f and (b) find the directional derivative of f at (4, 2, 0) in the direction of v = i + 4j β k. SOLUTION (a) The gradient of f is βf(x, y, z) = fx(x, y, z), fy(x, y, z), fz(x, y, z)
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Mathematics, 21.06.2019 16:30, pennygillbert
Which of the following answers is 5/25 simplified? 1/5 5/5 2/5 1/25
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Mathematics, 21.06.2019 17:40, zaygonegraduate
Follow these steps using the algebra tiles to solve the equation β5x + (β2) = β2x + 4. 1. add 5 positive x-tiles to both sides and create zero pairs. 2. add 4 negative unit tiles to both sides and create zero pairs. 3. divide the unit tiles evenly among the x-tiles. x =
Answers: 1
g EXAMPLE 5 If f(x, y, z) = x sin(yz), (a) find the gradient of f and (b) find the directional deriv...
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