How do you find the length of the curve #x=3t+1, y=2-4t, 0<=t<=1#? Calculus Applications of Definite Integrals Determining the Length of a Curve 1 Answer Harish Chandra Rajpoot Jul 27, 2018 #5\ \text{units# Explanation: Given that #x=3t+1\implies dx/dt=3# #y=2-4t\implies dy/dt=-4# #\therefore \frac{dy}{dx}=\frac{dy/dt}{dx/dt}# #=\frac{-4}{3}# #=-4/3# hence the length of curve #f(x)# is given as #\int ds# #=\int \sqrt{(dx)^2+(dy)^2}# #=\int \sqrt{1+(dy/dx)^2}\ dx# #=\int_0^1 \sqrt{1+(-4/3)^2}\ (3dt)# #=\int_0^1 5/3 (3dt)# #=5\int_0^1 dt# #=5[t]_0^1# #=5\ \text{units# Answer link Related questions How do you find the arc length of #y=ln(cos(x))# on the interval #[pi/6,pi/4]#? What is arc length parametrization? How do you find the length of a curve defined parametrically? How do you find the length of a curve using integration? How do you find the length of a curve in calculus? How do you find the arc length of #x=2/3(y-1)^(3/2)# between #1<=y<=4#? How do you find the length of the curve #y=x^5/6+1/(10x^3)# between #1<=x<=2# ? How do you find the length of the curve #y=e^x# between #0<=x<=1# ? How do I find the arc length of the curve #y=ln(sec x)# from #(0,0)# to #(pi/ 4, ln(2)/2)#? How do I find the arc length of the curve #y=ln(cos(x))# over the interval #[0,π/4]#? See all questions in Determining the Length of a Curve Impact of this question 2213 views around the world You can reuse this answer Creative Commons License