dy dy dx2 dx tycos(ox 8) Solve: 47+d7+y - cos(ox) Find the amplitude of the steady-state solution (after transients have died down) in terms of w. The find the value of that makes the amplitude as large as possible.
dy dy dx2 dx tycos(ox 8) Solve: 47+d7+y - cos(ox) Find the amplitude of the steady-state solution (after transients have died down) in terms of w. The find the value of that makes the amplitude as large as possible.
just answer pls
Find fyy if f(x,y) = x In y + yet. Ox+ y 20 er + ye*
For y = f(x) = x - 2x + 4, find dy and Ay, given x = 5 and Ax = 0.2 dy = (Type an integer or a decimal.)
This Question: 1 pt For y = f(x)=2x-1, x= 3, and Ax=2 find a) Ay for the given x and Ax values, b) dy = f'(x)dx, c) dy for the given x and Ax values a) Ay = || (Round to four decimal places as needed b) dy = f'(x)dx= ( ) ox Bound to two decimal places as seeded
17. For f(x, y)=e***+y)? of Ox? XZ of 18. For f(x, y, z)= =? y + z oz 19. For f(x, y, z) = cos’ (3x – y’) – x’ tanz, ar ax of = ? 20. For S(x, y) = x cos y + ye", дхду
Let f be the function defined as follows. y=f(x)=8x2-2x+10 (a) Find the differential of f. dy = (b) Use your result from part (a) to find the approximate change in y if x changes from 2 to 1.97. (Round your answer to two decimal places.) dy = (c) Find the actual change in y if x changes from 2 to 1.97 and compare your result with that obtained in part (b). (Round your answer to two decimal places.) Δy =
Find all the first order partial derivatives for the following function. f(x,y) = (9x3y5 – 10) 2 of A. Of ox = 27x2y5; - 45x3y4 Oy of 54x2y5 (9x3y5 – 10); dy of B. = = 90x3y4 (9x3y5 – 10) ox C. of ox df 90x3y4(9x3y5 – 10); ду = 54x2y5 (9x3y5 – 10) of of D. = 2(9x3y5 – 10); = 2(9x3y5 – 10) Ox ду
(a) [1[*(2x*y + 4y2) dy dx (b) ["" ["(y cos(x) + 6) dy dx cos [**(buye* * *) ay ox (a) LiS.*r-* log(4) dy dx (-x log(y)) dy dx -Il
Find dy/dx by implicit differentiation. x?y? - y = x dy/dx =
3. Find the values of dy and Ay for y = 2x2 + x - 3 when x = 2 and Ax=dx=-0.03 Ay = f (x+ Ax) - S (x) and dy = f'(x) dx Go to four decimal places.