Ask Dr. Math High School Archive

Dr. Math Home || Elementary || Middle School || High School || College || Dr. Math FAQ

 TOPICS This page:   polyhedra    Search   Dr. Math See also the Dr. Math FAQ:   geometric formulas and   naming polygons   and polyhedra Internet Library:   polyhedra HIGH SCHOOL About Math Analysis Algebra    basic algebra    equations/graphs/      translations    linear algebra    linear equations    polynomials Calculus Complex Numbers Calculators/    Computers Definitions Discrete Math    permutations/    combinations Exponents    Logarithms Fibonacci Sequence/   Golden Ratio Fractals Functions Geometry    Euclidean/plane      conic sections/        circles      constructions      coordinate plane      triangles/polygons    higher-dimensional      polyhedra    non-Euclidean    practical geometry    symmetry/tessellations History/Biography Interest Logic Negative Numbers Number Theory Physics/Chemistry Probability Projects Puzzles Sequences/Series Sets Square/Cube Roots Statistics Transcendental   Numbers Trigonometry Browse High School Polyhedra Stars indicate particularly interesting answers or good places to begin browsing. Definitions as a Tool of Mathematics [03/04/2003] Defining polyhedra: regarding unusual polyhedra, how can we exclude 'doubled' shapes, e.g. two tetrahedra that join at a single vertex (sort of like an hourglass)? How Many Cube Faces Were Painted? [02/23/2003] Some unit cubes are put together to form a larger cube. Some of the larger cube's faces are painted and then it is taken apart. 45 small cubes are found to have no paint on them. How many faces of the large cube were painted? Only Five Platonic Solids [03/05/1998] Why there are only five platonic solids. Painting Cubes [01/06/2003] How many unit cubes would be needed to create a cube with a side length of 3 units? If you painted the larger cube and broke it up into unit cubes, how many faces of each unit cube would be painted? Polyhedra: Solids or Surfaces? [06/06/2003] Is a polyhedron always a solid figure? Angles in a Hexagonal Pyramid [07/25/2002] In a gazebo whose roof is a hexagonal pyramid with a particular pitch, how can I find the angles at which the roof panels meet? Angles of an Octahedron [07/20/1998] What is the angle between two adjacent faces of an octahedron? The Angles of a Tetrahedron [07/08/1998] Why is the angle from one vertex to the exact center of the tetrahedron around 109.5 degrees? Bases and Faces [12/05/2001] I can't figure out the difference between a base and a face on the shapes we are learning. Biggest Cuboid in a Sphere [03/20/2003] I have a sphere with radius of 10cm. I have to find the biggest cuboid that fits in that sphere. Calculating Angles Between Faces of a Solid [09/15/2003] How can I compute the dihedral angles for a Great Rhombicosidodecahedron? Classifying Quadrilaterals [01/25/2006] How can a square also be a rectangle? Constructing a Pyramid [05/28/1999] How can I calculate the sides and angles needed to construct a pyramid with an 8-foot-square base and a height of 6 feet? Constructing a Sphere out of Paper [02/08/2003] I'm working on a school project and can't seem to find the answer anywhere. The assignment is to construct a 3D 9'-diameter sphere out of paper. Construction of Cone Surface [10/12/2002] What is the relation between the angle of a cone at the vertex and the flat angle (theta) of the developed surface on a plane? Cubes in a Big Cube [03/11/2002] Is there a formula for the number of cubes in an n*n*n cube? Cups and Volume [12/06/2001] How can I calculate the volume of a box, if I know how many cups of rice fill it? And how can 2 cups be a volume measure? Cutting a Cube [07/05/1999] How many pieces will there be if you make every (flat) slice through a cube that goes through exactly three of the cube's corners - no more and no less? Cutting a Square into Five Equal Pieces [07/12/1999] How can you divide a square cake into five equal parts, cutting through the center point? Cutting Cake with Geometry [2/4/1996] A cake is square when viewed from the top. Height is unspecified. It is iced on top and the four vertical sides. How can the cake be divided in 5 pieces such that each piece has the same amount of cake and the same amount of icing? How can you minimize the number of cuts you have to make in the cake and still meet this target? Alternatively, how can you minimize the total length of the cuts you make in the cake? Cylinders and Euler's Rule [09/06/2002] How and why does Euler's rule work for cylinders? Defining and Counting Faces, Edges, and Vertices of Shapes [04/06/2004] How do you find the faces, edges, and vertices of any shape? I just go blank, because I really don't understand it. Definitions of Cones and Cylinders [03/02/2004] Are cones and cylinders pyramids, prisms or neither? My 5th grade geometry class cannot reach an agreement on this subject! Derivation of Sphere Volume and Surface Area Formulas [03/14/2005] Currently in math class we are discussing surface areas and volumes of solids. I would like to know why the volume formula for the sphere is (4/3)*pi*r^3 and why the surface area formula is 4*pi*r^2. Determining Polyhedron Name from Given Description [11/16/2003] What is the name of the geometric solid having 7 faces, 10 vertices, and 15 edges? Thank you! Diagonals and Symmetry in Polyhedra [09/15/2002] I would like a formula for finding the number of diagonals in a Platonic solid. Diagonals in 3D Figures [06/21/1999] Could you help me develop a formula for determining the number of diagonals in various 3D figures, especially pyramids and prisms? Dimensions of a Cardboard Box [09/28/1997] A box with a square bottom and a volume of 2000 centimeters can be made by cutting 5-centimeter squares from the corners of a piece of cardboard... Do Cones and Cylinders Have Faces or Surfaces? [03/16/2004] Are the sides of a cone or cylinder called faces or are they curved surfaces? I've seen different books with different answers. Some also say that a cone has no vertex. Do Pyramids Really Exist? [02/27/2002] If the base of an isosceles triangle is 4, and the height is 5, then the sides are equal to the square root of 21. How can this triangle exist (except in theory) if you can never measure or draw the square root of 21? Edges, Vertices, Surfaces [04/22/2003] How can a shape have 8 edges and 5 vertices? How can a shape have 12 edges, all the same length? How can a shape have 3 surfaces, one curved? Eleven Nets of a Cube [11/15/2001] My teacher says that there are 11 combinations to make a cube without reversing them, but I can only find 6. Euler's Formula [11/26/2001] I have to find Euler's formula for two-dimensional figures and explain it at a university level and at an elementary-school level. Euler's Formula for Polyhedra [08/12/1997] How would you prove Euler's formula V-E+F = 2 for all polyhedra of genus zero? Faces, Vertices, and Edges of Cylinders, Cones, and Spheres [12/28/2003] Do cylinders, cones and spheres have faces, vertices, and edges? I'm not sure how they would fit into Euler's formula of v - e + f = 2. Find Depth of Water in a Tank [08/02/2003] A rectangular tank measures 4m long, 2m wide and 4.8m high. Initially it is half full of water. Find the depth of water in the tank after 4000 litres of water have been added to it. Finding Area and Volume [04/12/2001] When working with area and volume of triangular shapes, how do I know when to divide the base by 2 and when to divide it by 3? Finding Surface Areas [06/17/2002] Can you explain how to find the surface areas of solids? Finding the Area of an Irregular Polygon [02/23/2008] What is the formula for finding the area of an irregular polygon? Finding the Dimensions of a Box [10/21/2001] You want to construct a cardboard box from a cardboard strip that is 8 inches wide. The dimensions of the box are 8"x8"x4". How long does the strip need to be? Page:  1  2  3 [next>]

Search the Dr. Math Library:

 Search: entire archive just High School Polyhedra Find items containing (put spaces between keywords):   Click only once for faster results: [ Choose "whole words" when searching for a word like age.] all keywords, in any order at least one, that exact phrase parts of words whole words