TITLE

Solution to Isotope Pattern Geometry Challenge

AUTHOR(S)
Meija, Juris
PUB. DATE
January 2005
SOURCE
Analytical & Bioanalytical Chemistry;Jan2005, Vol. 381 Issue 1, p13
SOURCE TYPE
Academic Journal
DOC. TYPE
Article
ABSTRACT
Provides the solution to the isotope pattern geometry challenge published in the 308 (1) issue of "Analytical & Bioanalytical Chemistry." Observation of the Cosmati floor mosaic; Creation of a perennial fractal image; Comparison of the coefficients in the standard Pascal's triangle and the isotope patterns of bromine or silver.
ACCESSION #
16004415

 

Related Articles

  • Professor POU/POE. Bauman, David M. // Water Technology;May2011, Vol. 34 Issue 5, p34 

    The article provides an answer to several questions related to treatment for radioactive iodine in water.

  • Neither by global nor local cues alone: evidence for a unified orientation process. Bodily, Kent D.; Eastman, Caroline E.; Sturz, Bradley R. // Animal Cognition;Sep2011, Vol. 14 Issue 5, p665 

    A substantial amount of empirical and theoretical debate remains concerning the extent to which an ability to orient with respect to the environment is determined by global (i.e., principal axis of space), local (i.e., wall lengths, angles), and/or view-based (i.e., stored representation)...

  • Solid and Dynamic. Dubrovsky, Vladimir N. // Micromath;Autumn2004, Vol. 20 Issue 3, p24 

    The article discusses the features of solid and dynamic geometry systems. According to the author, there are many professional programs of three dimensional graphics which produce beautiful and expressive models of spatial constructions. The main features that make such models three-dimensional...

  • Estimating extension and depth to detachment in simple rollover anticlines over listric normal faults. Poblet, Josep; Bulnes, Mayte // Trabajos de Geologia;2005, Vol. 25, p85 

    A number of geometrical techniques allow estimating amounts of horizontal extension and depth to detachment in simple rollover anticlines over listric normal faults given one or more horizons, the portion of the fault between the hanging wall and foot wall cut off points, and the depth to...

  • DISCOVERY with Neville de Mestre.  // Australian Mathematics Teacher;Mar2009, Vol. 65 Issue 1, p12 

    The article provides information on how to fold various basic geometric shapes from an A4 sheet of paper. Several ways of folding the various geometric figures are described. It also notes that Pythagoras' theorem can be used to determine the possible shapes of the figure and the sides of the...

  • Elementary properties of optimal irrigation patterns. Devillanova, G.; Solimini, S. // Calculus of Variations & Partial Differential Equations;Mar2007, Vol. 28 Issue 3, p317 

    In this paper we follow the approach in Maddalena et al. (Interfaces and Free Boundaries 5, 391�415, 2003) to the study of the ramified structures and we identify some geometrical properties enjoyed by optimal irrigation patterns. These properties are �elementary� in the sense...

  • THE MATHS BUSTERS -- the geometry of the Dam Busters. Ransom, Peter // Mathematics in School;Mar2004, Vol. 33 Issue 2, p22 

    Proposes a worksheet activity for measuring the geometry of the Dam Busters raid that took place on the Möhne, Eder and Sorpe dams in Germany on May 16 and 17, 1943. Conceptualization of the activity; Procedures for doing the activity; Feedback from students.

  • GEOMETRIC MODEL OF THE ROPE CREATED OF OVAL STRANDS. Stanová, Eva // Transport & Logistics;2013, Vol. 13 Issue 26, p1 

    A steel rope is a structure composed of individual wires which are grouped into strands of various shapes. The strands form a rope. Hence, when considering geometric construction of the rope it is necessary to focus on the geometry of the individual wires. The paper deals with the mathematical...

  • The Equiangular Compass. Milici, P.; Dawson, R. // Mathematical Intelligencer;Dec2012, Vol. 34 Issue 4, p63 

    The article presents a study which examines the constructive power of the equiangular compass that can create certain polygons and cubic circles in geometric diagrams. It explores the practical constructive potential of the equiangular compass to unify the straightedge and extend to the...

Share

Read the Article

Courtesy of THE LIBRARY OF VIRGINIA

Sorry, but this item is not currently available from your library.

Try another library?
Sign out of this library

Other Topics