What is the arc length of #f(t)=(t^2-4t,5-t) # over #t in [3,4] #?
1 Answer
Mar 16, 2018
Explanation:
#f(t)=(t^2−4t,5−t)#
#f'(t)=(2t−4,−1)#
Arc length is given by:
#L=int_3^4sqrt((2t-4)^2+1)dt#
Apply the substitution
#L=1/2intsec^3thetad theta#
This is a known integral:
#L=1/4[secthetatantheta+ln|sectheta+tantheta|]_3^4#
Reverse the substitution:
#L=1/4[(2t-4)sqrt((2t-4)^2+1)+ln|(2t-4)+sqrt((2t-4)^2+1)|]_3^4#
Insert the limits of integration:
#L=1/2(2sqrt17-sqrt5)+1/4ln((4+sqrt17)/(2+sqrt5))#