Evaluatesin¹(x). First identify y(u) and u(x) so that y(u(x)) dy du = du. Then multiply together, write everything as a dx function of x and place your final answer in the last box. dx sin(x). Place your first answer in the form For example, (x² + 3x + 1)4 = 4u³ · (2x +3) = 4(x² + 3x+1)³. (2x +3) is how you would enter your answer. dx sin¹(x) = =

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Evaluatesin¹(x).
First identify y(u) and u(x) so that
y(u(x))
dy
du
=
du. Then multiply together, write everything as a
da
function of x and place your final answer in the last box.
dx
sin(x). Place your first answer in the form
For example,
(x² + 3x +1) 4 = 4u³ · (2x + 3) = 4(x² + 3x +1)³. (2x + 3)
is how you would enter your answer.
dx
sin¹(x)
=
=
Transcribed Image Text:Evaluatesin¹(x). First identify y(u) and u(x) so that y(u(x)) dy du = du. Then multiply together, write everything as a da function of x and place your final answer in the last box. dx sin(x). Place your first answer in the form For example, (x² + 3x +1) 4 = 4u³ · (2x + 3) = 4(x² + 3x +1)³. (2x + 3) is how you would enter your answer. dx sin¹(x) = =
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