How do you find the surface area of a solid of revolution? Calculus Applications of Definite Integrals Determining the Surface Area of a Solid of Revolution 1 Answer Wataru Sep 21, 2014 If the solid is obtained by rotating the graph of #y=f(x)# from #x=a# to #x=b#, then the surface area #S# can be found by the integral #S=2pi int_a^b f(x)sqrt{1+[f'(x)]^2}dx# Answer link Related questions How do you find the surface area of the solid obtained by rotating about the #y#-axis the region... How do you find the surface area of the solid obtained by rotating about the #x#-axis the region... How do you find the surface area of the solid obtained by rotating about the #x#-axis the region... How do you find the surface area of the solid obtained by rotating about the #y#-axis the region... How do you find the surface area of the solid obtained by rotating about the #x#-axis the region... How do you find the surface area of the solid obtained by rotating about the #x#-axis the region... How do you find the surface area of the part of the circular paraboloid #z=x^2+y^2# that lies... How do you determine the surface area of a solid revolved about the x-axis? How do you find the centroid of the quarter circle of radius 1 with center at the origin lying... What is the surface area produced by rotating #f(x)=1-x, x in [0,3]# around the x-axis? See all questions in Determining the Surface Area of a Solid of Revolution Impact of this question 5348 views around the world You can reuse this answer Creative Commons License