Advertisement
| magic square 3x3 questions: Connections Maths Edward Duffy, G. Murty, Lorraine Mottershead, 2003 The Connections Maths 7 Teaching and Assessment Book includes many re sources that makes using the Connections series the most effective and u ser-friendly series available. The resources in this book include : a teaching program referenced to the student book syllabus notes detailed guidance on teaching each topic outcomes clearly stated and cross referenced to the student book assessment and reporting strategies over 70 photocopiable worksheets for use with talented students solutions to all wor ksheets overview and summary of every chapter and exercise in t he student book answers to activities in the student book relevant internet sites and further research questions all this material is also provided on CD-ROM to allow for customising |
| magic square 3x3 questions: Smarandache Function Journal, vol.8/1997 C. Dumitrescu , V. Seleacu , A collection of papers concerning Smarandache type functions, numbers, sequences, inteqer algorithms, paradoxes, experimental geometries, algebraic structures, neutrosophic probability, set, and logic, etc. |
| magic square 3x3 questions: Numbers in Your Head John Spooner, 1998 You know what content to teach, but do you know how to achieve a broad coverage of teaching styles? And ensure that children work in a range of mathematical modes? These books will put you on the right track. * over 40 lessons per book * develop these core activities to suit different ability levels * detailed assessments help you determine children's understanding. |
| magic square 3x3 questions: Mathematics for Machine Learning Marc Peter Deisenroth, A. Aldo Faisal, Cheng Soon Ong, 2020-04-23 The fundamental mathematical tools needed to understand machine learning include linear algebra, analytic geometry, matrix decompositions, vector calculus, optimization, probability and statistics. These topics are traditionally taught in disparate courses, making it hard for data science or computer science students, or professionals, to efficiently learn the mathematics. This self-contained textbook bridges the gap between mathematical and machine learning texts, introducing the mathematical concepts with a minimum of prerequisites. It uses these concepts to derive four central machine learning methods: linear regression, principal component analysis, Gaussian mixture models and support vector machines. For students and others with a mathematical background, these derivations provide a starting point to machine learning texts. For those learning the mathematics for the first time, the methods help build intuition and practical experience with applying mathematical concepts. Every chapter includes worked examples and exercises to test understanding. Programming tutorials are offered on the book's web site. |
| magic square 3x3 questions: Magic Squares John Lee Fults, 1974 |
| magic square 3x3 questions: Diophantine Analysis Robert Daniel Carmichael, 1915 |
| magic square 3x3 questions: Proceedings of the First International Conference on Smarandache Type Notions in Number Theory, University of Craiova, 21-24 August 1997 (second edition) C. Dumitrescu, V. Seleacu, 2000-08-01 |
| magic square 3x3 questions: Generatingfunctionology Herbert S. Wilf, 2014-05-10 Generatingfunctionology provides information pertinent to generating functions and some of their uses in discrete mathematics. This book presents the power of the method by giving a number of examples of problems that can be profitably thought about from the point of view of generating functions. Organized into five chapters, this book begins with an overview of the basic concepts of a generating function. This text then discusses the different kinds of series that are widely used as generating functions. Other chapters explain how to make much more precise estimates of the sizes of the coefficients of power series based on the analyticity of the function that is represented by the series. This book discusses as well the applications of the theory of generating functions to counting problems. The final chapter deals with the formal aspects of the theory of generating functions. This book is a valuable resource for mathematicians and students. |
| magic square 3x3 questions: Geometric Magic Squares Lee C. F. Sallows, 2013 Traditional magic squares employ a chessboard-like arrangement of numbers in which the total of all rows, columns, and diagonals add up to the same number. This innovative approach by a Dutch engineer challenges puzzlists to think two dimensionally by replacing numbers with colorful geometric shapes. Dozens of creative puzzles, suitable for ages 12 and up. |
| magic square 3x3 questions: The Book of the Sacred Magic of Abramelin the Mage , 2012-07-12 DIVMedieval manuscript of ceremonial magic. Basic document in Aleister Crowley, Golden Dawn groups. /div |
| magic square 3x3 questions: Ask a Little-Learn a Lot R. W. A. Mitchell, 2012-08 The best way to learn comes by simply asking questions. This work communicates that the best way to explore new ideas comes simply by asking questions. |
| magic square 3x3 questions: Smarandache Notions , 1996 |
| magic square 3x3 questions: Taking Sudoku Seriously Jason Rosenhouse, Laura Taalman, 2012-01-19 Packed with more than a hundred color illustrations and a wide variety of puzzles and brainteasers, Taking Sudoku Seriously uses this popular craze as the starting point for a fun-filled introduction to higher mathematics. How many Sudoku solution squares are there? What shapes other than three-by-three blocks can serve as acceptable Sudoku regions? What is the fewest number of starting clues a sound Sudoku puzzle can have? Does solving Sudoku require mathematics? Jason Rosenhouse and Laura Taalman show that answering these questions opens the door to a wealth of interesting mathematics. Indeed, they show that Sudoku puzzles and their variants are a gateway into mathematical thinking generally. Among many topics, the authors look at the notion of a Latin square--an object of long-standing interest to mathematicians--of which Sudoku squares are a special case; discuss how one finds interesting Sudoku puzzles; explore the connections between Sudoku, graph theory, and polynomials; and consider Sudoku extremes, including puzzles with the maximal number of vacant regions, with the minimal number of starting clues, and numerous others. The book concludes with a gallery of novel Sudoku variations--just pure solving fun! Most of the puzzles are original to this volume, and all solutions to the puzzles appear in the back of the book or in the text itself. A math book and a puzzle book, Taking Sudoku Seriously will change the way readers look at Sudoku and mathematics, serving both as an introduction to mathematics for puzzle fans and as an exploration of the intricacies of Sudoku for mathematics buffs. |
| magic square 3x3 questions: Algorithmic Puzzles Anany Levitin, Maria Levitin, 2011-10-14 Algorithmic puzzles are puzzles involving well-defined procedures for solving problems. This book will provide an enjoyable and accessible introduction to algorithmic puzzles that will develop the reader's algorithmic thinking. The first part of this book is a tutorial on algorithm design strategies and analysis techniques. Algorithm design strategies — exhaustive search, backtracking, divide-and-conquer and a few others — are general approaches to designing step-by-step instructions for solving problems. Analysis techniques are methods for investigating such procedures to answer questions about the ultimate result of the procedure or how many steps are executed before the procedure stops. The discussion is an elementary level, with puzzle examples, and requires neither programming nor mathematics beyond a secondary school level. Thus, the tutorial provides a gentle and entertaining introduction to main ideas in high-level algorithmic problem solving. The second and main part of the book contains 150 puzzles, from centuries-old classics to newcomers often asked during job interviews at computing, engineering, and financial companies. The puzzles are divided into three groups by their difficulty levels. The first fifty puzzles in the Easier Puzzles section require only middle school mathematics. The sixty puzzle of average difficulty and forty harder puzzles require just high school mathematics plus a few topics such as binary numbers and simple recurrences, which are reviewed in the tutorial. All the puzzles are provided with hints, detailed solutions, and brief comments. The comments deal with the puzzle origins and design or analysis techniques used in the solution. The book should be of interest to puzzle lovers, students and teachers of algorithm courses, and persons expecting to be given puzzles during job interviews. |
| magic square 3x3 questions: Math for Programmers Paul Orland, 2020-11-30 A gentle introduction to some of the most useful mathematical concepts that should be in your developer toolbox. - Christopher Haupt, New Relic Explore important mathematical concepts through hands-on coding. Purchase of the print book includes a free eBook in PDF, Kindle, and ePub formats from Manning Publications. Filled with graphics and more than 300 exercises and mini-projects, this book unlocks the door to interesting–and lucrative!–careers in some of today’s hottest fields. As you tackle the basics of linear algebra, calculus, and machine learning, you’ll master the key Python libraries used to turn them into real-world software applications. Summary To score a job in data science, machine learning, computer graphics, and cryptography, you need to bring strong math skills to the party. Math for Programmers teaches the math you need for these hot careers, concentrating on what you need to know as a developer. Filled with lots of helpful graphics and more than 200 exercises and mini-projects, this book unlocks the door to interesting–and lucrative!–careers in some of today’s hottest programming fields. About the technology Skip the mathematical jargon: This one-of-a-kind book uses Python to teach the math you need to build games, simulations, 3D graphics, and machine learning algorithms. Discover how algebra and calculus come alive when you see them in code! What's inside Vector geometry for computer graphics Matrices and linear transformations Core concepts from calculus Simulation and optimization Image and audio processing Machine learning algorithms for regression and classification About the reader For programmers with basic skills in algebra. About the author Paul Orland is a programmer, software entrepreneur, and math enthusiast. He is co-founder of Tachyus, a start-up building predictive analytics software for the energy industry. You can find him online at www.paulor.land. Table of Contents 1 Learning math with code PART I - VECTORS AND GRAPHICS 2 Drawing with 2D vectors 3 Ascending to the 3D world 4 Transforming vectors and graphics 5 Computing transformations with matrices 6 Generalizing to higher dimensions 7 Solving systems of linear equations PART 2 - CALCULUS AND PHYSICAL SIMULATION 8 Understanding rates of change 9 Simulating moving objects 10 Working with symbolic expressions 11 Simulating force fields 12 Optimizing a physical system 13 Analyzing sound waves with a Fourier series PART 3 - MACHINE LEARNING APPLICATIONS 14 Fitting functions to data 15 Classifying data with logistic regression 16 Training neural networks |
| magic square 3x3 questions: Number, Shape, & Symmetry Diane L. Herrmann, Paul J. Sally, Jr., 2012-10-18 Through a careful treatment of number theory and geometry, Number, Shape, & Symmetry: An Introduction to Number Theory, Geometry, and Group Theory helps readers understand serious mathematical ideas and proofs. Classroom-tested, the book draws on the authors’ successful work with undergraduate students at the University of Chicago, seventh to tenth grade mathematically talented students in the University of Chicago’s Young Scholars Program, and elementary public school teachers in the Seminars for Endorsement in Science and Mathematics Education (SESAME). The first half of the book focuses on number theory, beginning with the rules of arithmetic (axioms for the integers). The authors then present all the basic ideas and applications of divisibility, primes, and modular arithmetic. They also introduce the abstract notion of a group and include numerous examples. The final topics on number theory consist of rational numbers, real numbers, and ideas about infinity. Moving on to geometry, the text covers polygons and polyhedra, including the construction of regular polygons and regular polyhedra. It studies tessellation by looking at patterns in the plane, especially those made by regular polygons or sets of regular polygons. The text also determines the symmetry groups of these figures and patterns, demonstrating how groups arise in both geometry and number theory. The book is suitable for pre-service or in-service training for elementary school teachers, general education mathematics or math for liberal arts undergraduate-level courses, and enrichment activities for high school students or math clubs. |
| magic square 3x3 questions: The Trachtenberg Speed System of Basic Mathematics Jakow Trachtenberg, 2011-03-01 Do high-speed, complicated arithmetic in your head using the Trachtenberg Speed System. Ever find yourself struggling to check a bill or a payslip? With The Trachtenberg Speed System you can. Described as the 'shorthand of mathematics', the Trachtenberg system only requires the ability to count from one to eleven. Using a series of simplified keys it allows anyone to master calculations, giving greater speed, ease in handling numbers and increased accuracy. Jakow Trachtenberg believed that everyone is born with phenomenal abilities to calculate. He devised a set of rules that allows every child to make multiplication, division, addition, subtraction and square-root calculations with unerring accuracy and at remarkable speed. It is the perfect way to gain confidence with numbers. |
| magic square 3x3 questions: Enrichment Units in Math Dianne Draze, 2021-09-09 Go beyond the regular curriculum with these units to challenge your more able intermediate grade math students. With their ease of use, clear instruction, and motivating topics, these are the perfect enrichment activities for the regular math curriculum. This book contains four units that are structured so that students can easily develop an understanding of the topics on their own. The four topics are: probability, topology, magic squares, and number characteristics. Each unit provides sequential activities that allow students to work through these motivating topics, whether they are working by themselves, in a small group, or in a whole-class setting. The units lend themselves easily to a math center arrangement with each student having an individual folder and checklist to record his or her progress. While they were designed to provide added challenge for students who have mastered the regular curriculum, some of the units can be used as supplements for whole-class instruction. The emphasis in these units is on promoting thinking, developing perseverance, expanding students' view of mathematics, enjoying a challenge, and keeping math students actively involved and enthused about math. This book will help you provide students with opportunities to explore mathematical ideas in ways that promote their intellectual growth and expand their views of mathematics. This is one of a three-book series. For younger students, see Enrichment Units in Math Book 1—attribute pattern blocks, tangrams, sets and Venn diagrams, and ancient Egyptian numbers; and Enrichment Units in Math Book 2—permutations and combinations, tessellations, line drawings, and graphing. For other math units to extend the math curriculum and provide opportunities to work independently, see Math Extension UnitsBook 1 and Book 2. Grades 5-7 |
| magic square 3x3 questions: Magic Squares and Cubes William Symes Andrews, 1908 |
| magic square 3x3 questions: Advanced Problems in Mathematics: Preparing for University Stephen Siklos, 2016-01-25 This book is intended to help candidates prepare for entrance examinations in mathematics and scientific subjects, including STEP (Sixth Term Examination Paper). STEP is an examination used by Cambridge colleges as the basis for conditional offers. They are also used by Warwick University, and many other mathematics departments recommend that their applicants practice on the past papers even if they do not take the examination. Advanced Problems in Mathematics is recommended as preparation for any undergraduate mathematics course, even for students who do not plan to take the Sixth Term Examination Paper. The questions analysed in this book are all based on recent STEP questions selected to address the syllabus for Papers I and II, which is the A-level core (i.e. C1 to C4) with a few additions. Each question is followed by a comment and a full solution. The comments direct the reader's attention to key points and put the question in its true mathematical context. The solutions point students to the methodology required to address advanced mathematical problems critically and independently. This book is a must read for any student wishing to apply to scientific subjects at university level and for anybody interested in advanced mathematics. |
| magic square 3x3 questions: The Zen of Magic Squares, Circles, and Stars Clifford A. Pickover, 2004-01-18 Provides a history of magic squares and similar structures, describing their construction and classification, along with informaiton on newly discovered objects. |
| magic square 3x3 questions: Fatwās of Condemnation Saiyad Nizamuddin Ahmad, 2006 |
| magic square 3x3 questions: Before Sudoku Seymour S. Block, Santiago Alves Tavares, 2009 Fans of sudoku may not know that the game is a recent offshoot of the venerable Magic Square, which dates back more than 4,000 years to ancient China. This book provides a delightful account of the mind-boggling variety possible with magical squares. |
| magic square 3x3 questions: The Complete Idiot's Guide to Algebra W. Michael Kelley, 2004 The complete hands-on, how-to guide to engineering an outstanding customer experience! Beyond Disney and Harley-Davidson - Practical, start-to-finish techniques to be used right now, whatever is sold. Leverages the latest neuroscience to help readers assess, audit, design, implement and steward any customer experience. By Lou Carbone, CEO of Experience Engineering, Inc., the world's #1 customer experience consultancy. |
| magic square 3x3 questions: Mathematics of Public Key Cryptography Steven D. Galbraith, 2012-03-15 This advanced graduate textbook gives an authoritative and insightful description of the major ideas and techniques of public key cryptography. |
| magic square 3x3 questions: Introductory Combinatorics Kenneth P. Bogart, 1990 Introductory, Combinatorics, Third Edition is designed for introductory courses in combinatorics, or more generally, discrete mathematics. The author, Kenneth Bogart, has chosen core material of value to students in a wide variety of disciplines: mathematics, computer science, statistics, operations research, physical sciences, and behavioral sciences. The rapid growth in the breadth and depth of the field of combinatorics in the last several decades, first in graph theory and designs and more recently in enumeration and ordered sets, has led to a recognition of combinatorics as a field with which the aspiring mathematician should become familiar. This long-overdue new edition of a popular set presents a broad comprehensive survey of modern combinatorics which is important to the various scientific fields of study. |
| magic square 3x3 questions: Learn & Use Microsoft Excel in Your Classroom (Learn & Use Technology in Your Classroom) , |
| magic square 3x3 questions: STP Caribbean Mathematics C. Layne, 1997 |
| magic square 3x3 questions: The Number Sense Stanislas Dehaene, 2011-04-29 Our understanding of how the human brain performs mathematical calculations is far from complete. In The Number Sense, Stanislas Dehaene offers readers an enlightening exploration of the mathematical mind. Using research showing that human infants have a rudimentary number sense, Dehaene suggests that this sense is as basic as our perception of color, and that it is wired into the brain. But how then did we leap from this basic number ability to trigonometry, calculus, and beyond? Dehaene shows that it was the invention of symbolic systems of numerals that started us on the climb to higher mathematics. Tracing the history of numbers, we learn that in early times, people indicated numbers by pointing to part of their bodies, and how Roman numerals were replaced by modern numbers. On the way, we also discover many fascinating facts: for example, because Chinese names for numbers are short, Chinese people can remember up to nine or ten digits at a time, while English-speaking people can only remember seven. A fascinating look at the crossroads where numbers and neurons intersect, The Number Sense offers an intriguing tour of how the structure of the brain shapes our mathematical abilities, and how math can open up a window on the human mind-- Provided by publisher. |
| magic square 3x3 questions: Universal Science Mahdī Ḥāʾirī Yazdī, 2017-04-20 The Universal Science (ʿIlm-i kullī) by Mahdī Ḥaʾiri Yazdī is a concise and authoritative introduction to the fundamental discussions in Islamic metaphysics. This short work offers an accessible, lucid, and deeply learned, guide through the 'living tradition' of Shīʿī philosophy. |
| magic square 3x3 questions: Across the Board John J. Watkins, 2011-09-19 Across the Board is the definitive work on chessboard problems. It is not simply about chess but the chessboard itself--that simple grid of squares so common to games around the world. And, more importantly, the fascinating mathematics behind it. From the Knight's Tour Problem and Queens Domination to their many variations, John Watkins surveys all the well-known problems in this surprisingly fertile area of recreational mathematics. Can a knight follow a path that covers every square once, ending on the starting square? How many queens are needed so that every square is targeted or occupied by one of the queens? Each main topic is treated in depth from its historical conception through to its status today. Many beautiful solutions have emerged for basic chessboard problems since mathematicians first began working on them in earnest over three centuries ago, but such problems, including those involving polyominoes, have now been extended to three-dimensional chessboards and even chessboards on unusual surfaces such as toruses (the equivalent of playing chess on a doughnut) and cylinders. Using the highly visual language of graph theory, Watkins gently guides the reader to the forefront of current research in mathematics. By solving some of the many exercises sprinkled throughout, the reader can share fully in the excitement of discovery. Showing that chess puzzles are the starting point for important mathematical ideas that have resonated for centuries, Across the Board will captivate students and instructors, mathematicians, chess enthusiasts, and puzzle devotees. |
| magic square 3x3 questions: Ben Franklin and the Magic Squares Frank Murphy, 2013-05-29 A funny, entertaining introduction to Ben Franklin and his many inventions, including the story of how he created the magic square. A magic square is a box of nine numbers arranged so that any line of three numbers adds up to the same number, including on the diagonal! Teachers and kids will love finding out about this popular teaching tool that is still used in elementary schools today! |
| magic square 3x3 questions: Notes on Rubik's Magic Cube David Singmaster, 1981 |
| magic square 3x3 questions: The Boy Who Dreamed of Infinity: A Tale of the Genius Ramanujan Amy Alznauer, 2020-04-14 A young mathematical genius from India searches for the secrets hidden inside numbers — and for someone who understands him — in this gorgeous picture-book biography. A mango . . . is just one thing. But if I chop it in two, then chop the half in two, and keep on chopping, I get more and more bits, on and on, endlessly, to an infinity I could never ever reach. In 1887 in India, a boy named Ramanujan is born with a passion for numbers. He sees numbers in the squares of light pricking his thatched roof and in the beasts dancing on the temple tower. He writes mathematics with his finger in the sand, across the pages of his notebooks, and with chalk on the temple floor. “What is small?” he wonders. “What is big?” Head in the clouds, Ramanujan struggles in school — but his mother knows that her son and his ideas have a purpose. As he grows up, Ramanujan reinvents much of modern mathematics, but where in the world could he find someone to understand what he has conceived? Author Amy Alznauer gently introduces young readers to math concepts while Daniel Miyares’s illustrations bring the wonder of Ramanujan’s world to life in the inspiring real-life story of a boy who changed mathematics and science forever. Back matter includes a bibliography and an author’s note recounting more of Ramanujan’s life and accomplishments, as well as the author’s father’s remarkable discovery of Ramanujan’s Lost Notebook. |
| magic square 3x3 questions: The Lions of Little Rock Kristin Levine, 2012-01-05 Satisfying, gratifying, touching, weighty—this authentic piece of work has got soul.—The New York Times Book Review As twelve-year-old Marlee starts middle school in 1958 Little Rock, it feels like her whole world is falling apart. Until she meets Liz, the new girl at school. Liz is everything Marlee wishes she could be: she's brave, brash and always knows the right thing to say. But when Liz leaves school without even a good-bye, the rumor is that Liz was caught passing for white. Marlee decides that doesn't matter. She just wants her friend back. And to stay friends, Marlee and Liz are even willing to take on segregation and the dangers their friendship could bring to both their families. Winner of the New-York Historical Society Children’s History Book Prize A New York Times Book Review Editor’s Choice |
| magic square 3x3 questions: An Introduction to Numerical Analysis Kendall Atkinson, 1991-01-16 This Second Edition of a standard numerical analysis text retains organization of the original edition, but all sections have been revised, some extensively, and bibliographies have been updated. New topics covered include optimization, trigonometric interpolation and the fast Fourier transform, numerical differentiation, the method of lines, boundary value problems, the conjugate gradient method, and the least squares solutions of systems of linear equations. Contains many problems, some with solutions. |
| magic square 3x3 questions: Basic Maths For Dummies Colin Beveridge, 2011-07-26 Whether you are returning to school, studying for an adult numeracy test, helping your kids with homework, or seeking the confidence that a firm maths foundation provides in everyday encounters, Basic Maths For Dummies, UK Edition, provides the content you need to improve your basic maths skills. Based upon the Adult Numeracy Core Curriculum, this title covers such topics as: Getting started with the building blocks of maths and setting yourself up for success Dealing with decimals, percentages and tackling fractions without fear Sizing Up weights, measures, and shapes How to handle statistics and gauge probability Filled with real-world examples and written by a PhD-level mathematician who specialises in tutoring adults and students, Basic Maths For Dummies also provides practical advice on overcoming maths anxiety and a host of tips, tricks, and memory aids that make learning maths (almost) painless - and even fun. |
| magic square 3x3 questions: Discrete Mathematics and Its Applications Kenneth Rosen, 2006-07-26 Discrete Mathematics and its Applications, Sixth Edition, is intended for one- or two-term introductory discrete mathematics courses taken by students from a wide variety of majors, including computer science, mathematics, and engineering. This renowned best-selling text, which has been used at over 500 institutions around the world, gives a focused introduction to the primary themes in a discrete mathematics course and demonstrates the relevance and practicality of discrete mathematics to a wide a wide variety of real-world applications...from computer science to data networking, to psychology, to chemistry, to engineering, to linguistics, to biology, to business, and to many other important fields. |
| magic square 3x3 questions: Inspiring Motivation in Children and Youth David A. Bergin, 2022-09-26 Inspiring Motivation in Children and Youth: How to Nurture Environments for Learning explores motivation and its crucial role in promoting well-being in the classroom and life beyond school. It will help all those who work with children and youth to understand and improve their motivation, and to create nurturing environments for younger people. David Bergin provides a highly accessible exploration of key research, examining the ways children’s goals, self-efficacy, self-determination, and feelings of being cared for affects their motivation as well as their desire to learn more about themselves and the world. This essential guide also addresses influences of competition, diversity, prejudice, and discrimination on motivation. The book provides a comprehensive look at the importance of instilling motivation at this critical age, highlighting the benefits through real-life examples and anecdotes. Illustrated with stories from diverse contexts, the author provides practical advice on how to use goals effectively, help children feel competent, autonomous, and like they belong. Inspiring Motivation in Children and Youth is for any student looking to excel in a psychological, educational, health, or social work setting, as well as professionals in the field, and parents. It is targeted for people who work or plan to work with children from pre-school to high school and will be useful to teachers, youth leaders, coaches, counselors, social workers, and nurses. |
| magic square 3x3 questions: How to Think Like a Mathematician Kevin Houston, 2009 This arsenal of tips and techniques eases new students into undergraduate mathematics, unlocking the world of definitions, theorems, and proofs. |
What are magic numbers and why do some consider them bad?
Oct 13, 2023 · However magic numbers are also sometimes used for in-memory data structures, like ioctl() calls. A quick check of the magic number before processing the file or data structure …
Shroomery - Magic Mushrooms (Shrooms) Demystified
We help spread accurate information about magic mushrooms so people can make informed decisions about what they put in their bodies. You can learn about the effects of shrooms and …
Shroomery - Growing Mushrooms
Learn how to grow magic mushrooms, gourmet mushrooms, and medicinal mushrooms easily and cheaply at home.
Shroomery - Magic Mushroom Dosage Calculator
Jun 13, 2023 · Magic Mushroom Dosage Calculator Roughly estimates a dosage in grams based on the species and potency of the mushroom, whether or not it's dried, and other factors. I wrote …
Shroomery - Gallery
Gallery of shrooms growing and picked from the wild. If you want help identifying your own finds, please use our Mushroom Hunting and Identification forum.
python - How to pass the script path to %run magic command as a ...
Aug 22, 2021 · Magic commands such as %run and %fs do not allow variables to be passed in. The workaround is you can use dbutils as like dbutils.notebook.run(notebook, 300 ,{}) Share
Shroomery Message Board
Discuss magic mushrooms and other hallucinogens, get cultivation advice, and learn about the psychedelic experience.
Plot inline or a separate window using Matplotlib in Spyder IDE
Mar 30, 2015 · Magic commands such as %matplotlib qt work in the iPython console and Notebook, but do not work within a script. In that case, after importing: from IPython import get_ipython …
How to send a Wake-on-LAN magic packet using PowerShell?
Jul 4, 2022 · Here is the working PowerShell one-liner I am using to send a WakeOnLan packet: '01-23-45-67-89-AB' | Set-Variable 'mac'; [System.Net.NetworkInformation ...
Explaining Python's '__enter__' and '__exit__' - Stack Overflow
Using these magic methods (__enter__, __exit__) allows you to implement objects which can be used easily with the with statement. The idea is that it makes it easy to build code which needs some …
What are magic numbers and why do some consider them bad?
Oct 13, 2023 · However magic numbers are also sometimes used for in-memory data structures, like ioctl() calls. A quick check of the magic number before processing the file or data structure …
Shroomery - Magic Mushrooms (Shrooms) Demystified
We help spread accurate information about magic mushrooms so people can make informed decisions about what they put in their bodies. You can learn about the effects of shrooms and …
Shroomery - Growing Mushrooms
Learn how to grow magic mushrooms, gourmet mushrooms, and medicinal mushrooms easily and cheaply at home.
Shroomery - Magic Mushroom Dosage Calculator
Jun 13, 2023 · Magic Mushroom Dosage Calculator Roughly estimates a dosage in grams based on the species and potency of the mushroom, whether or not it's dried, and other factors. I …
Shroomery - Gallery
Gallery of shrooms growing and picked from the wild. If you want help identifying your own finds, please use our Mushroom Hunting and Identification forum.
python - How to pass the script path to %run magic command as …
Aug 22, 2021 · Magic commands such as %run and %fs do not allow variables to be passed in. The workaround is you can use dbutils as like dbutils.notebook.run(notebook, 300 ,{}) Share
Shroomery Message Board
Discuss magic mushrooms and other hallucinogens, get cultivation advice, and learn about the psychedelic experience.
Plot inline or a separate window using Matplotlib in Spyder IDE
Mar 30, 2015 · Magic commands such as %matplotlib qt work in the iPython console and Notebook, but do not work within a script. In that case, after importing: from IPython import …
How to send a Wake-on-LAN magic packet using PowerShell?
Jul 4, 2022 · Here is the working PowerShell one-liner I am using to send a WakeOnLan packet: '01-23-45-67-89-AB' | Set-Variable 'mac'; [System.Net.NetworkInformation ...
Explaining Python's '__enter__' and '__exit__' - Stack Overflow
Using these magic methods (__enter__, __exit__) allows you to implement objects which can be used easily with the with statement. The idea is that it makes it easy to build code which needs …
