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Question is attatched please show steps

asked Aug 13, 2024 71.1k views

2 votes

Question is attatched
please show steps

Question is attatched please show steps-example-1

Mathematics
high-school

by Archie

8.2k points

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1 Answer

4 votes

Answer:

4.05

Explanation:

(a)

$\boxed{(d)/(dx) (u\cdot v)=u\cdot dv+v\cdot du}$

$(d)/(dx) (x\cdot ln\ x)=x((1)/(x) )+1(ln\ x)$

$=1+ln\ x$

(b)

since
$(d)/(dx) (x\cdot ln\ x)=1+ln\ x$

therefore
$\int {(d)/(dx) (x\cdot ln\ x)=\int {(1+ln\ x)} \, dx }$

$\int {(d)/(dx) (x\cdot ln\ x)=\int {1} \, dx } +\int {ln\ x} \, dx }$

$x\cdot ln\ x=x+\int {ln\ x} \, dx }$

$\int {ln\ x} \, dx } =x\cdot ln\ x-x$

$\int\limits^5_1 {ln\ x} \, dx =(5(ln\ 5)-5)-(1(ln\ 1)-1)$

$=5(ln\ 5)-ln\ 1 -5+1$

$=5(ln\ 5)-ln\ 1 -4$

=4.05

Frank Van Wijk answered Aug 19, 2024

by Frank Van Wijk

7.6k points

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