Asked by hewhomustbenamed82
Let f(x) = e^x and g(x) = sin(lnx). Find equations for two distinct parallel lines l1 and l2 where; l1 is tangent to f at x = 0 and l2 is tangent to g.
Answers
Answered by
Steve
f'(x) = e^x
f'(0) = 1
g'(x) = cos(lnx)/x
cos(lnx)/x=1
cos(lnx)=x
x = 0.0089,0.2745
So, you want lines with slope=1 passing through
(0,1),(0.0089,0.9933),(0.2745,-0.9610)
y-1 = x
y-0.9933 = x-0.0089
y+0.9610 = x-0.2745
See the graphs at
http://www.wolframalpha.com/input/?i=plot+y%3Dsin(lnx),y%3De%5Ex,y%3Dx%2B0.9910,+y%3Dx-1.2355+for+0.0080%3Cx%3C1
f'(0) = 1
g'(x) = cos(lnx)/x
cos(lnx)/x=1
cos(lnx)=x
x = 0.0089,0.2745
So, you want lines with slope=1 passing through
(0,1),(0.0089,0.9933),(0.2745,-0.9610)
y-1 = x
y-0.9933 = x-0.0089
y+0.9610 = x-0.2745
See the graphs at
http://www.wolframalpha.com/input/?i=plot+y%3Dsin(lnx),y%3De%5Ex,y%3Dx%2B0.9910,+y%3Dx-1.2355+for+0.0080%3Cx%3C1
Answered by
Steve
oops. there is also another solution at x=1 since cos(log1)/1 = cos(0)/1 = 1/1 = 1
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