(17) Let f(x) = e. Then • f'(0) = • f'(x) = ● That is, (18) I d da MTH 32

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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(17) Let f(x) = e. Then
• f'(0) =
f'(x)
That is,
d
da (ex)
-
• y = sin(x)e+³
(18) Let u = u(r). Then by the Chain Rule, (e)
(19) Find the derivatives of:
• y = er²
MTH 32
d
dx
(20) Since (e) = e, we have fe* dx =
(21) Find f cos(r)esin(x) dx.
=
y = e
COS I
• y =
eta
41
Transcribed Image Text:(17) Let f(x) = e. Then • f'(0) = f'(x) That is, d da (ex) - • y = sin(x)e+³ (18) Let u = u(r). Then by the Chain Rule, (e) (19) Find the derivatives of: • y = er² MTH 32 d dx (20) Since (e) = e, we have fe* dx = (21) Find f cos(r)esin(x) dx. = y = e COS I • y = eta 41
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