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1. Find the domain of these functions.
1.21 z = 1 / √x2 + y2-5
2. Find the partial derivatives and partial differentials of the following functions.
2.21 z = sin (x + y) / (x-y)
3. Calculate the value of partial f´x (M0), f´y (M0), f´z (M0), for the function f (x, y, z) at the point M0 (x0, y0, z0) with an accuracy of to two decimal places
3.21 f (x, y, z) = 8 * 5√x3 + y2 + z, M0 (3, 2, 1)
4. Find the total differentials of these functions.
4.21 z = arcsin ((x + y) / x))
5. Calculate the value of the derivative of a composite function u = u (x, y), where x = x (t), y = y (t), at t = t0 up to two decimal places.
5.21 u = √x2 + y + 3, x = lnt, y = t2, t0 = 1
6. Calculate the values of the partial derivatives of the function z (x, y) given implicitly at the point M0 (x0, y0, z0) accurate to two decimal places.
1.21 z = 1 / √x2 + y2-5
2. Find the partial derivatives and partial differentials of the following functions.
2.21 z = sin (x + y) / (x-y)
3. Calculate the value of partial f´x (M0), f´y (M0), f´z (M0), for the function f (x, y, z) at the point M0 (x0, y0, z0) with an accuracy of to two decimal places
3.21 f (x, y, z) = 8 * 5√x3 + y2 + z, M0 (3, 2, 1)
4. Find the total differentials of these functions.
4.21 z = arcsin ((x + y) / x))
5. Calculate the value of the derivative of a composite function u = u (x, y), where x = x (t), y = y (t), at t = t0 up to two decimal places.
5.21 u = √x2 + y + 3, x = lnt, y = t2, t0 = 1
6. Calculate the values of the partial derivatives of the function z (x, y) given implicitly at the point M0 (x0, y0, z0) accurate to two decimal places.
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- Added to the site 09.07.2025
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Detailed solution. Designed in PDF format for easy viewing of IDZ solutions on smartphones and PCs. In MS Word (doc format) sent additionally.
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