What is the arc length of the curve given by #r(t)= (1,t,t^2)# on # t in [0, 1]#?
1 Answer
Jun 20, 2018
Explanation:
#r(t)=(1,t,t^2)#
#r'(t)=(0,1,2t)#
Arc length is given by:
#L=int_0^1sqrt(0^2+1^2+(2t)^2)dt#
Simplify:
#L=int_0^1sqrt(1+4t^2)dt#
Apply the substitution
#L=1/2intsec^3thetad theta#
This is a known integral. If you do not have it memorized apply integration by parts or look it up in a table of integrals:
#L=1/4[secthetatantheta+ln|sectheta+tantheta|]#
Reverse the substitution:
#L=1/4[2tsqrt(1+4t^2)+ln|2t+sqrt(1+4t^2)|]_0^1#
Insert the limits of integration:
#L=1/2sqrt5+1/4ln(2+sqrt5)#
