These exercises reference the Theorem of Papp u s : If R is a bounded plane region and L is a line that lies in the plane of R such that R is entirely on one side of L , then the volume of the solid formed by revolving R about L is given by volume = area of R ⋅ distance traveled by the centroid Perform the following steps to prove the Theorem of Pappus: (a) Introduce an xy - coordinate system so that L is along the y -axis and the region R is in the first quadrant. Partition R into rectangular subregions in the usual way and let R k be a typical subregion of R with center x k * , y k * and area Δ A k = Δ x k Δ y k . Show that the volume generated by R k as it revolves about L is 2 π x k * Δ x k Δ y k = 2 π x k * Δ A k (b) Show that the volume generated by R as it revolves about L is V = ∬ R 2 π x d A = 2 π ⋅ x ¯ ⋅ [ area of R ]
These exercises reference the Theorem of Papp u s : If R is a bounded plane region and L is a line that lies in the plane of R such that R is entirely on one side of L , then the volume of the solid formed by revolving R about L is given by volume = area of R ⋅ distance traveled by the centroid Perform the following steps to prove the Theorem of Pappus: (a) Introduce an xy - coordinate system so that L is along the y -axis and the region R is in the first quadrant. Partition R into rectangular subregions in the usual way and let R k be a typical subregion of R with center x k * , y k * and area Δ A k = Δ x k Δ y k . Show that the volume generated by R k as it revolves about L is 2 π x k * Δ x k Δ y k = 2 π x k * Δ A k (b) Show that the volume generated by R as it revolves about L is V = ∬ R 2 π x d A = 2 π ⋅ x ¯ ⋅ [ area of R ]
These exercises reference the Theorem of Pappus: If R is a bounded plane region and L is a line that lies in the plane of R such that R is entirely on one side of L, then the volume of the solid formed by revolving R about L is given by
volume
=
area of
R
⋅
distance
traveled
by
the
centroid
Perform the following steps to prove the Theorem of Pappus:
(a) Introduce an xy-coordinate system so that L is along the y-axis and the region R is in the first quadrant. Partition R into rectangular subregions in the usual way and let
R
k
be a typical subregion of R with center
x
k
*
,
y
k
*
and area
Δ
A
k
=
Δ
x
k
Δ
y
k
. Show that the volume generated by
R
k
as it revolves about L is
2
π
x
k
*
Δ
x
k
Δ
y
k
=
2
π
x
k
*
Δ
A
k
(b) Show that the volume generated by R as it revolves about L is
V
=
∬
R
2
π
x
d
A
=
2
π
⋅
x
¯
⋅
[
area of
R
]
System that uses coordinates to uniquely determine the position of points. The most common coordinate system is the Cartesian system, where points are given by distance along a horizontal x-axis and vertical y-axis from the origin. A polar coordinate system locates a point by its direction relative to a reference direction and its distance from a given point. In three dimensions, it leads to cylindrical and spherical coordinates.
University Calculus: Early Transcendentals (4th Edition)
Knowledge Booster
Learn more about
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, calculus and related others by exploring similar questions and additional content below.