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Chapter 12: Q. 55. (page 945)

For the partial derivatives given in Exercises 55鈥�58, find the
most general form for a function of three variables, $f (x, y, z)$ ,
with the given partial derivative.
$\frac{鈭� f}{鈭� x} = 0$

Short Answer

Expert verified

The most general form of $f (x, y, z)$ so that $\frac{鈭� f}{鈭� x} = 0$ is $f (x, y, z) = h (y, z)$

Step by step solution

01

Given information

Given derivative is $\frac{鈭� f}{鈭� x} = 0$

02

The objective is to find the most general form of a function f(x, y, z)

Suppose $f (x, y, z) = h (y, z)$

$\frac{鈭� f}{鈭� x} = 0$ Because $y$ and $z$ treated as constant.

Hence, the most general form of $f (x, y, z)$ so that $\frac{鈭� f}{鈭� x} = 0$ is $f (x, y, z) = h (y, z)$

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Most popular questions from this chapter

$A chain rule for functions of two variables : Let f (x, y) = x^{2} y^{3}, x = s \cos t, and y = s \sin t . Substitute the expressions for x and y into f (x, y) .$

Find the directional derivative of the given function at the specified point P in the direction of the given vector. Note: The given vectors may not be unit vectors.

$f (x, y) = \frac{x y}{x^{2} + y^{2}}, P = (鈭� 2, 1), v = <\frac{3}{5}, 鈭� \frac{4}{5}>$

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$\lim_{(x, y) 鈫� (1, 2)} \frac{x^{2} + y^{2}}{x^{2} - y^{2}}$

Evaluate the following limits, or explain why the limit does not exist.

$\lim_{(x, y, z) 鈫� (0, 0, 0)} \frac{x^{2} + y^{2}}{x^{2} + y^{2} + z^{2}}$

In Exercises, find the maximum and minimum of the function f subject to the given constraint. In each case explain why the maximum and minimum must both exist.

$f (x, y, z) = x + y + z when x^{2} + 4 y^{2} + 16 z^{2} = 64$

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