(p. 774) An oblique cylinder is a cylinder whose ____ is not perpendicular to the bases.
(p. 772) The formula for the volume of a(n) ____ with edge s is V = s³.
(p. 836) The lateral area of a right cone with radius r and slant height ℓ is L = __rℓ.
(p. 834) The lateral area of a regular pyramid with perimeter P and _____ height ℓ is L = (1/2)Pℓ.
(p. 826) The lateral area of a cylinder is the area of the ______ surface that connects the two bases.
(p. 774) A(n) _______ prism is a prism that has at least one non-rectangular lateral face.
(p. 833) The base of a(n) _______ pyramid is a(n) _______ polygon, and the lateral faces are congruent isosceles triangles.
(p. 845) You can derive the formula for the surface area of a sphere with radius r by imagining that it is filled with a large number of pyramids, whose ______ all meet at the center of the sphere and whose bases rest against the sphere's surface.
(p. 818) You can generate a three-dimensional figure by ________ a two-dimensional figure around an appropriate axis.
(p. 835) The ____ of a cone is a(n) _______ with endpoints at the vertex and the center of the base.
(p. 794) The volume of a cone with ____ radius r and ____ area B = πr² and height h is given by V = (1/3)Bh or by V = (1/3)πr²h.
(p. 776) Recall that a(n) _________ figure is made up of simple shapes that combine to create a more complex shape.
(p. 835) A right cone is a cone whose axis is _____________ to the base.
(p. 826) The surface area of a _____ cylinder with lateral area L and base area B is S = L + 2B, or S = 2πrh + 2πr².
(p. 771) A right _____ has lateral edges that are perpendicular to the bases, with faces that are all rectangles.
(p. 801) To show that cross sections have the same level at every base, use the __________ Theorem to find a relationship between r, x, and R.
(p. 823) The _______ area of a prism is the sum of the area of the _______ faces.
(p. 802) The volume of a sphere with ______ r is given by V = (4/3)πr³.
(p. 783) No matter where C is located on line l, the area of the resulting △ABC is always a(n) ________ equal to (1/2)bh.
(p. 775) If two solids have the ____ height and the ____ cross-sectional area at every level, then the two solids have the ____ volume.
(p. 801) To find the volume of a sphere, compare one of its hemispheres to a cylinder of the same height and radius from which a cone has been _______.
Where is my puzzle?