In Problems 35–38, find the volume of the solid under the graph of each function over the given rectangle.
35.
Want to see the full answer?
Check out a sample textbook solutionChapter 7 Solutions
FIN 108 ISU LOOSE >IP<
- Problem 10 The volume of the solid obtained by rotating the region enclosed by y=(x^2), y=2x, about the line y=0 can be computed using the method of disks or washers via an integral V=∫[upper limit=b, lower=a]____________dx with limits of integration a=________ and b=________arrow_forwardProblem 4 The volume of the solid obtained by rotating the region enclosed by y=1/(x^3), y=0, x=2, x=7 about the y-axis can be computed using the method of cylindrical shells via an integral V=∫___________ dx (with lower limit a and upper limit b) with limits of integration a=_________ and b=__________ the volume is V= _______________ cubic unitsarrow_forwardProblem 3 The volume of the solid obtained by rotating the region enclosed by y=21x-(7x^2), y=0 about the axis can be computed using the method of cylindrical shells via an integral V=∫_______________ dx with limits of integration a (lower limit)= and b (upper limit)= The volume is V= _______ cubis unitsarrow_forward
- Problem 11 The volume of the solid obtained by rotating the region bounded by y=(x^2), y=4x, about the line x=4 can be computed using the method of washers via an integral V=∫________________dy (with lower limit of a and upper limit of b) with limits of integration a=_________ and b=_________ The volume of this solid can also be computed using cylindrical shells via an integral V=∫_______________dx (with lower limt of alpha and upper limit of beta) with limits of integration alpha=_________ and beta=__________ In either case, the volume is V=______________ cubic unitsarrow_forwardProblem 8 The volume of the solid obtained by rotating the region enclosed by y=(e^3x)+3, y=0, x=0, x=0.2 about the x-axis can be computed using the method of disksor washers via an integral V=∫[upper limit=b, lower limit=a]______ dx with limits of integration a=______ and b=_______arrow_forwardProblem 10 The volume of the solid obtained by rotating the region bounded by y=(x^2), y=3x about the line y=9 can be computed using the method of washers or disks via an integral V=∫________________dx (with lower limit of a and upper limit of b) with limits of integration a=_________ and b=_________ The volume of this solid can also be computed using cylindrical shells via an integral V=∫_______________dy (with lower limit of alpha and upper limit of beta) with limits of integration alpha=_________ and beta=__________arrow_forward
- Problem 9 The volume of the solid obtained by rotating the region bounded by x=(9y^2), y=1, x=0 about the y-axis can be computed using the method of washers or disks via an integral V=∫________________dy (with lower limit of a and upper limit of b) with limits of integration a=_________ and b=_________ The volume of this solid can also be computed using cylindrical shells via an integral V=∫_______________dx (with lower limt of alpha and upper limit of beta) with limits of integration alpha=_________ and beta=__________ In either case, the volume is V=______________ cubic unitsarrow_forwardProblem 13 The volume of the solid obtained by rotating the region bounded by x=(y^2), x=5y about the line y=5 can be computed using the method of washers or disks via an integral V=∫________________dx (with lower limit of a and upper limit of b) with limits of integration a=_________ and b=_________ The volume of this solid can also be computed using cylindrical shells via an integral V=∫_______________dy (with lower limt of alpha and upper limit of beta) with limits of integration alpha=_________ and beta=__________arrow_forward1) Consider the region in the xy-plane that is bounded by y = 3 x^2 and y=3x for x ≥ 0. Revolve this region about the y-axis Super quickly so that your eyes glaze over and it eventually looks like a solid object at one point. What would the volume of this solid be? Make sure to include every step.arrow_forward
- Problem 12 The volume of the solid obtained by rotating the region bounded by y=(x^2), y=5x about the line x=-2 can be computed using the method of washers or disks via an integral V=∫________________dy (with lower limit of a and upper limit of b) with limits of integration a=_________ and b=_________ The volume of this solid can also be computed using cylindrical shells via an integral V=∫_______________dx (with lower limt of alpha and upper limit of beta) with limits of integration alpha=_________ and beta=__________ In either case, the volume is V=______________ cubic unitsarrow_forwardIf the area bounded by y = x2 and y = 2 – x2 is revolved about the x – axis and a vertical rectangular element is taken, the element of volumegenerated is a:arrow_forwardThe solid bounded by the surfaces: S1 : −2(z − 2) = y2S2 : z = (x−1)/2S3 : x = 0S4 : y = 0S5 : z = 0 Corresponds to: the graph is in the first attached image If V is the volume of the previous solid, then it is true that: the answers are in the second attached imagearrow_forward
- Discrete Mathematics and Its Applications ( 8th I...MathISBN:9781259676512Author:Kenneth H RosenPublisher:McGraw-Hill EducationMathematics for Elementary Teachers with Activiti...MathISBN:9780134392790Author:Beckmann, SybillaPublisher:PEARSON
- Thinking Mathematically (7th Edition)MathISBN:9780134683713Author:Robert F. BlitzerPublisher:PEARSONDiscrete Mathematics With ApplicationsMathISBN:9781337694193Author:EPP, Susanna S.Publisher:Cengage Learning,Pathways To Math Literacy (looseleaf)MathISBN:9781259985607Author:David Sobecki Professor, Brian A. MercerPublisher:McGraw-Hill Education