At what point does the curve have maximum curvature? What happens to the curvature as x tends to infinity y=\ln x

Globokim8

Globokim8

Answered question

2021-05-19

At what point does the curve have maximum curvature? What happens to the curvature as x tends to infinity y=lnx

Answer & Explanation

diskusje5

diskusje5

Skilled2021-05-20Added 82 answers

f(x)=lnx
f(x)=1x
f(x)=1x2
Plug into the curvature formula
k(x)=|f(x)|[1+(f(x))2]32=|1x2|[1+(1x)2]32=1x2[1+1x2]32
Find k'
k(x)=1x2[1+1x2]3/2=x2[1+1x2]3/2
k(x)=2x3[1+1x2]3/2+x232[1+1x2]5/2(2x3)
=2x3[1+1x2]3/2+3x5[1+1x2]5/2
=2x2(1+1x2)+3x5[1+1x2]5/2
=2x22+3x5[1+1x2]5/2
=22x2x5[1+1x2]5/2
Find where k'=0
0=12x2
2x2=1
x=120.7071
The negative root is not in the domain of ln x. We can check numbers in the surrounding intervals to make sure it is the max:
(0,0,7):k(0,1)0.96
(0,7,):k(1)0.18
k is increasing then decreasing, so it is the max.
As x:
limx1x2[1+1x2]3/21[1+0]3/20
the curvature approaches 0.

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