![The volume of a paper cone of radius 2.4 cm is 95.4 cm³. Find the sector angle x°& capacity of tank. - YouTube The volume of a paper cone of radius 2.4 cm is 95.4 cm³. Find the sector angle x°& capacity of tank. - YouTube](https://i.ytimg.com/vi/lQ5967-JDOo/maxresdefault.jpg)
The volume of a paper cone of radius 2.4 cm is 95.4 cm³. Find the sector angle x°& capacity of tank. - YouTube
![Plane and solid geometry . Given CD a section of cone V-AB made by a plane II base AB.To prove section CD a O. Outline of Proof 1. Let It and S Plane and solid geometry . Given CD a section of cone V-AB made by a plane II base AB.To prove section CD a O. Outline of Proof 1. Let It and S](https://c8.alamy.com/comp/2ANJDHW/plane-and-solid-geometry-given-cd-a-section-of-cone-v-ab-made-by-a-plane-ii-base-abto-prove-section-cd-a-o-outline-of-proof-1-let-it-and-s-be-any-two-points-on-the-boundary-of-sectioncd-pass-planes-through-ov-and-points-r-and-s-2-prove-a-vom-a-vpr-and-a-von-a-vps-om-on-o-rr-om-vo-on-vo-o-ihen-=-and-=-ie-pr-vp-ps-vp-pr-ps-4-but-om-=-on-ps-pr-ie-p-is-equidistant-from-anytwo-points-on-the-boundary-of-section-cd-5-section-cd-is-a-o-qed-849-cor-any-section-of-a-cone-parallel-to-its-base-isto-the-base-as-the-square-of-its-distance-from-the-vertexi-2ANJDHW.jpg)
Plane and solid geometry . Given CD a section of cone V-AB made by a plane II base AB.To prove section CD a O. Outline of Proof 1. Let It and S
![Elements of geometry and trigonometry . rectangleABCD turns about AB, the line KI, perpen-dicular to AB, describes a circle, equal to the base, and thiscircle is nothing else than the section made Elements of geometry and trigonometry . rectangleABCD turns about AB, the line KI, perpen-dicular to AB, describes a circle, equal to the base, and thiscircle is nothing else than the section made](https://c8.alamy.com/comp/2AJ4653/elements-of-geometry-and-trigonometry-rectangleabcd-turns-about-ab-the-line-ki-perpen-dicular-to-ab-describes-a-circle-equal-to-the-base-and-thiscircle-is-nothing-else-than-the-section-made-perpendicular-tothe-axis-at-the-point-i-every-section-pqg-made-through-the-axis-is-a-rectangledouble-of-the-generating-rectangle-abcd-2-a-cone-is-the-solid-generated-by-the-revolution-of-a-right-angled-triangle-sab-conceived-to-turn-about-the-immoveableside-sa-in-this-movement-the-side-ab-describesa-circle-bdce-named-the-hase-of-the-cone-the-hypothenuse-sb-describes-the-convexsurface-of-the-2AJ4653.jpg)
Elements of geometry and trigonometry . rectangleABCD turns about AB, the line KI, perpen-dicular to AB, describes a circle, equal to the base, and thiscircle is nothing else than the section made
![SOLVED: The diagram shows a cone: Diagram NOT accurately drawn. AB is a diameter of the cone. V is the vertex of the cone. Given that the area of the base of SOLVED: The diagram shows a cone: Diagram NOT accurately drawn. AB is a diameter of the cone. V is the vertex of the cone. Given that the area of the base of](https://cdn.numerade.com/ask_images/8d57ec27bdbd4258a2bdcba6f2ea0aaf.jpg)