W. D. Gann's Courses
The Collected Courses of W. D. Gann, Volumes 1-5 - By W. D. Gann
The Collected Courses of W. D. Gann, Volumes 1-5 - By W. D. Gann
Collected Courses of William D. Gann, by W. D. Gann. 1920 - 1954. This is the most complete and best organized collection of Gann's Master Courses, his most important writings. Without these, Gann is impossible to understand! We've collected all the missing pieces and reorganized them back into Gann's original order.
Long Term Investing
Long Term Investing
Long Term Investing
The time window is a main consideration when investing. Position trading methods will be of importance to the long term investor because he will want to know when to expect his greatest returns, and when to exit or hedge his position. Much of Gann’s work focuses on long term market movements, as he always tried to see the BIG picture.
Eric Penicka: Gann Science
Eric Penicka: Gann Science
Eric Penicka: Gann Science
The author correlates Gann's exact words to the science of Gann's day to illustrate his phrase "stocks are like atoms". Offering a system of "mathematical points of force" governing the structure through which the market moves, the emerging science of Periodic Table atomic elements provides a system of order through which to forecast.
Richard Scott
View our Richard Scott pages
View our Richard Scott pages
Scott dedicated 7 years to analyze 100 years of Dow Jones data to decode the causative effect of planetary influences. He analyzed the background energetic effects of astrological elements to project influences. His methods need NO prior astrological knowledge nor the use of a horoscope to trade the Global Index, Stock, Futures and FOREX markets.
Saint-Yves D'Alveydre
View our Saint-Yves D'Alveydre pages
View our Saint-Yves D'Alveydre pages
THE ARCHEOMETER: Key To All The Religions and Sciences of Antiquity; Synthetic Reformation of All Contemporary Arts. The Archeometer was used by the Ancients for the esoteric Canon of ancient Art and Science in its various architectural, musical and scientific forms. A respected elaboration of a Universal System by a great 19th century esotericist.
Health
Health
Health
Our collection contains a selection of works on physical development and health, from yoga, to theories of nutrition and the like based upon esoteric ideas and principles developed in different schools and traditions of thought.
Pythagorean
Pythagorean
Pythagorean
Pythagoras, educated in Egypt and India, later founded a school on the Isle of Samos. His system of the Quadrivium: Arithemetic, Geometry, Music and Astronomy, the 4 Classical Liberal Arts, provided a foundational curriculum for centuries. Pythagoras has been a major influence on many thinkers, including, Plato, Kepler and many modern philosophers.
Pause Start Back Next Translation Society Titles Top Science Titles Top Metaphysics Titles Science Categories Metaphysics Categories Cosmological Economics Financial Astrology
The Sacred Science Translation Society began in 2004 as a project to translate a collection of the most important and rare works on Cosmology & Esoteric Science into English. Through Angel DonorsSubscribtion Contributions we raised over $40,000 to translate famous foreign masterpieces from French & German on critical subjects in Harmonics, Geometry, Esoteric Mathematics, & Ancient Cosmology.
Hans Kayser was one of the 20th century's leading scientists who made a profound mathematical, geometric and philosophical study of the Science of Harmonics. Now finally avaible in English though our Translation Society, Kayser's series of works explore the deepest principles of Pythagorean Harmony & Order.  His profound research reveals critical insights into Gann Theory & The Law of Vibration.
Our second translation is a French masterpiece on the establishment of a "Golden Rule" according to the principles of Tantrism, Taoism, Pythagoreanism, & the Kabala, serving to fulfill the Laws of Universal Harmony & contributing to the accomplishment of the Great Work. It develops a system of correspondences between the symbolic, geometrical, mathematical & astronomical systems of architecture of the ancient world.
The Law Of The Cosmos: The Divine Harmony According To Plato's Republic/Timeaus. The Platonic Riddle Of Numbers Solved contains hundreds of the most sophisticated diagrams on Sacred Geometry, Pythagorean & Platonic Number Theory, Harmonics & Astronomy with analysis & elaboration of Universal Order & Cosmic Law. Herman Hesse called him a Magisterludi of the Glass Bead Game.
THE ARCHEOMETER: Key To All The Religions & Sciences of Antiquity, Synthetic Reformation of All Contemporary Arts. The Archeometer is the instrument used by the Ancients for the formation of the esoteric Canon of ancient Art and Science in its various architectural, musical, scientific forms. A highly respected elaborations of the Universal System, by one of the great esotericists of the 19th century.
W.D. Gann Works
W.D. Gann Works
W.D. Gann Works
We stock the complete collection of the works of W.D. Gann. His private courses represent the most important of his writings, going into much greater detail than the public book series. Our 6 Volume set of Gann's Collected Writings includes supplementary rare source materials, and is the most reliable compliation of Gann's unadulterated vital work.
Dr. Jerome Baumring
Dr. Jerome Baumring
Dr. Jerome Baumring
The work of Dr. Baumring is the core inspiration upon which this entire website is based. Baumring is the only known modern person to have cracked the code behind WD Gann’s system of trading and market order. Baumring found and elaborated the system of scientific cosmology at the root of Gann’s Law of Vibration. There is no other Gann teaching that gets close to the depth of Baumring’s work.
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SSI Rating: 4 Stars
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Hardcover
8vo - over 7¾
Motilal Banarsidass
Book ID: 221
Publication Date: 2005
Reprint Date: 2006
Importance (SSI Rating) – Our catalog comprises a specific collection of research materials carefully curated over a century by experts (ie. Gann & Baumring) to provide specific references and foundations in key fields essential for understanding this science. This rating highlights the level of importance each book has to this specific field of study.
Originality – Defines the level of originality of each specific work in its field and in relationship to the overriding subject matter.
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Customer – Customer ratings, reviews and comments. This is the only rating at most stores, but the least important for us, since anyone who rates these books poorly often will not understand their purpose or context. Our specialized curation demands that every book listed be important in a particular way. We do not include “bad” books in our catalog.
270 Pages
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This Elementary Manual is the third of three self-contained Manuals designed for teachers who with to teach the Vedic system, either to class or to other adults/teachers. It is also suitable for anyone who would like to teach themselves the Vedic methods.

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  • PREFACE
  • LESSON 1: LEFT TO RIGHT CALCULATIONS
    • 1.1 INTRODUCTION
    • 1.2 ADDITION
    • 1.3 MULTIPLICATION Advantages OF LEFT TO RIGHT CALCULATION
    • 1.4 WRITING LEFT TO RIGHT SUMS
    • 1.5 SUBTRACTION
    • 1.6 DIGIT SUMS
    • 1.7 CHECKING DEVICES CHECKING SUBTRACTION SUMS
    • 1.8 ALL FROM 9 AND THE LAST FROM 10
    • 1.8a SUBTRACTION FROM A BASE
    • 1.8b BAR NUMBERS ADVANTAGES OF BAR NUMBERS
    • 1.8c GENERAL SUBTRACTION
  • LESSON 2: SPECIAL METHODS
    • 2.1 MULTIPLICATION NEAR A BASE
    • 2.1a Numbers just below the base
    • 2.1.b Above the base
    • 2.1c Above and below
    • 2.1d Proportionately
    • 2.1e With different bases
    • 2.2 MENTAL CALCULATIONS
    • 2.3 SPECIAL NUMBERS
    • 2.3a Repeating numbers
    • 2.3b Proportionately
    • 2.3c Disguises
    • 2.4 DIVISION BY NINE
    • 2.4a Adding Digits
    • 2.4b A Short Cut
    • 2.4c Dividing by 8
    • 2.4d Algebraic Division
    • 2.4e Dividing by 11, 12 etc.
  • LESSON 3: RECURRING DECIMALS
    • 3.1 DENOMINATOR ENDING IN 9
    • 3.2 A SHORT CUT
    • 3.3 PROPORTIONATELY
    • 3.4 LONGER NUMERATORS
    • 3.5 DENOMINATORS ENDING IN 8, 7, 6
    • 3.6 DENOMINATORS ENDING IN 1
    • 3.7 DENOMINATORS ENDING IN 2, 3, 4
    • 3.8 WORKING 2, 3 ETC. FIGURES AT A TIME
  • LESSON 4: TRIPLES
    • 4.1 Definitions
    • 4.2 Triples for 45°, 30° and 60°
    • 4.3 Triple Addition
    • 4.4 Double Angle
    • 4.5 Variations of 3,4,5
    • 4.6 Quadrant Angles
    • 4.7 Rotations
  • LESSON 5: GENERAL MULTIPLICATION
    • 5.1 TWO-Figure Numbers Explanation/ The Digit Sum Check
    • 5.2 Moving Multiplier
    • 5.3 Algebraic PRODUCTS The Digit Sum Check
    • 5.4 Three-Figure Numbers
    • 5.5 Four-Figure Numbers
    • 5.6 Writing Left to Right Sums
    • 5.7 From Right to Left setting the sums out
    • 5.8 Using Bar Numbers
  • LESSON 6: SOLUTION OF EQUATIONS
    • 6.1 TRANSPOSE AND APPLY
    • 6.1a SIMPLE EQUATIONS
    • 6.1b MORE THAN ONE X TERM
    • 6.2 SIMULTANEOUS EQUATIONS
    • 6.2a GENERAL SOLUTION
    • 6.2b Special Types
    • 6.3 QUADRATIC EQUATIONS
    • 6.4 ONE IN RATIO THE OTHER ONE ZERO
    • 6.5 MERGERS
    • 6.6 WHEN THE SAMUCCAYA IS THE SAME IT IS ZERO
    • 6.6a Samuccaya as a common factor
    • 6.6b Samuccaya as the Product of the Independent Terms
    • 6.6c Samuccaya as the Sum of the Denominators
    • 6.6d Samuccaya as a Combination or Total Proof/ EXTENSION
    • 6.6e other typeS
    • 6.7 THE ULTIMATE AND TWICE THE PENULTIMATE
    • 6.8 ONLY THE LAST TERMS
    • 6.9 SUMMATION OF SERIES
    • 6.10 FACTORISATION
  • LESSON 7: SQUARES AND SQUARE ROOTS
    • 7.1 Squaring 2-FIGURE NUMBERS
    • 7.2 Algebraic Squaring
    • 7.3 Squaring Longer Numbers
    • 7.4 Written Calculations
    • 7.4a Left to Right
    • 7.4b Right to Left
    • 7.5 Square Roots of Perfect Squares
  • LESSON 8: APPLICATIONS OF TRIPLES
    • 8.1 Triple Subtraction
    • 8.2 Triple Geometry
    • 8.3 Angle Between Two Lines
    • 8.4 Half Angle
    • 8.5 Coordinate Geometry
    • 8.5a Gradients
    • 8.5b Length of Perpendicular
    • 8.5c Circle Problems
    • 8.5d EQUATION OF A LINE
    • 8.6 COMPLEX NUMBERS CONTENTS
  • LESSON 9: DIVISIBILITY
    • 9.1 Elementary Parts
    • 9.2 The Ekadhika
    • 9.3 Osculation Explanation
    • 9.4 Testing Longer Numbers
    • 9.5 Other Divisors
    • 9.6 The Negative Osculator
    • 9.7 OSCULATING WITH GROUPS OF DIGITS
  • LESSON 10: STRAIGHT DIVISION
    • 10.1 Single Figure on the Flag
    • 10.2 Short Division Digression
    • 10.3 Longer Numbers Multiplication Reversed
    • 10.4 Decimalising the Remainder
    • 10.5 Negative Flag Digits
    • 10.6 Larger Divisors
    • 10.7 ALGEBRAIC DIVISION
  • LESSON 11: SQUARE ROOTS
    • 11.1 Squaring
    • 11.2 Square Root of a Perfect square
    • 11.2a Preamble
    • 11.2b Two-Figure Answer Reversing Squaring
    • 11.2c Three-Figure Answer Reversing Squaring
    • 11.3 General Square Roots
    • 11.4 Changing the Divisor Heuristic Proof
    • 11.5 ALGEBRAIC SQUARE ROOTS
  • LESSON 12: TRIPLE TRIGONOMETRY
    • 12.1 COMPOUND ANGLES
    • 12.2 INVERSE FUNCTIONS
    • 12.3 THE GENERAL TRIPLE
    • 12.4 TRIGONOMETRIC EQUATIONS
    • 12.4a SIMPLE EQUATIONS
    • 12.4b A SPECIAL TYPE
  • LESSON 13: COMBINED OPERATIONS
    • 13.1 Algebraic
    • 13.2 Arithmetic
    • 13.2a SUMS OF PRODUCTS
    • 13.2b ADDITION AND DIVISION
    • 13.2c STRAIGHT DIVISION
    • 13.2d MEAN AND MEAN DEVIATION
    • 13.2e DIVIDING SUMS OF PRODUCTS
    • 13.2f VARIANCE
    • 13.3 Pythagoras’ Theorem
  • LESSON 14: SOLUTION OF POLYNOMIAL EQUATIONS
    • 14.1 QUADRATIC EQUATIONS
    • 14.1a x > 1 PROOF
    • 14.1b x 1
    • 14.1c 0 < x < 1
    • 14.1d 0 < x < 1 and x2 Coefficient > 1
    • 14.1e –1 < x < 0
    • 14.1f x LARGE
    • 14.2 HIGHER ORDER EQUATIONS
    • 14.2a CUBE ROOT
    • 14.2b CUBIC EQUATIONS A SIMPLIFICATION A CUBIC WITH 0 < x< 1
    • 14.2c QUINTICS
  • LESSON 15: CALCULUS METHODS
    • 15.1 Partial Fractions
    • 15.2 Integration by ‘Parts’; TRUNCATING
    • 15.3 BINOMIAL AND MACLAURIN THEOREMS
    • 15.4 Derivatives of a Product
    • 15.5 Derivative of A Quotient
    • 15.6 Differential Equations – 1
    • 15.7 Differential Equations – 2
    • 15.8 Limits 220
  • LESSON 16: APPLIED MATHEMATICS
    • 16.1 SIMPLE HARMONIC MOTION
    • 16.2 PROJECTILES
    • 16.3 FORCES IN EQUILIBRIUM
    • 16.4 WORK AND MOMENT
  • LESSON 17: TRIGONOMETRIC FUNCTIONS
    • 17.1 DERIVATIVES
    • 17.2 SERIES EXPANSIONS
    • 17.3 INVERSE TRIGONOMETRIC FUNCTIONS
    • 17.3a DERIVATIVES
    • 17.3b SERIES
    • 17.4 EVALUATING TRIGONOMETRIC FUNCTIONS
    • 17.4a COSINE
    • 17.4b SINE
    • 17.4c INVERSE TANGENT
  • LESSON 18: TRIGONOMETRIC AND TRANSCENDENTAL EQUATIONS
    • 18.1 POLYNOMIAL EQUATIONS
    • 18.2 TRIGONOMETRIC EQUATIONS
    • 18.3 TRANSCENDENTAL EQUATIONS; KEPLER’S EQUATION
  • REFERENCES
  • SUTRAS AND SUB-SUTRAS
  • INDEX OF THE VEDIC FORMULAE INDEX
  • INDEX

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Dewey's Cycle Analysis
How To Make a Cycle Analysis - By Edward Dewey
How To Make a Cycle Analysis - By Edward Dewey
How to Make a Cycle Analysis. By Edward R. Dewey. Written in 1955 as a correspondence course, this how-to manual provides step-by-step instructions on all elements of cycle analysis, including how to identify, measure, isolate and evaluate cycles. The most detailed cycle course ever written, by the founder of the Foundation For The Study of Cycles.
Wheels Within Wheels
Wheels Within Wheels - The Art of Forecasting Financial Market Cycles -
By Daniel T. Ferrera
Wheels Within Wheels - The Art of Forecasting Financial Market Cycles -
By Daniel T. Ferrera
Wheels Within Wheels, The Art of Forecasting Financial Market Cycles. By Daniel T. Ferrera. Our best course on creating composite cycle models of markets from underlying component cycles available! This course breaks down 16 Dow cycles and projects them 100 years into the future. Teaches how to create cycle models for ANY market.
Applied Gann Theory
Applied Gann Theory
Applied Gann Theory
Supported by the cosmological theory behind Gann’s work, we also specialize in practical tools needed to analyze and trade the markets. This category will specifically focus upon the books and courses that provide very specific and applied tools from Gann’s toolbox used for real time trading.
Forecasting
Forecasting Services
Forecasting Services
Not everyone has the skill, experience or desire to make forecasts of market phenomena, so they turn to experts who provide information to help anticipate market trends. Our top analysts provide forecasts or reports for different markets to help traders understand market action and get educational guidance with trading or investments.
George Bayer
George Bayer
George Bayer
Works by or about George Bayer, or source works referred to by Bayer or related to his work.
Hasbrouck Space and Time
Hasbrouck Space/Time
Hasbrouck Space/Time
With rare research from the 1920’s through the 1970’s, the Hasbrouck Space-Time Archives studied market influence based on Solar Field Force. Muriel Hasbrouck, aided by her husband Louis, researched solar phenomena, space weather and earthquakes in relation to market forecasting, producing a well-received forecasting letter for 30 years.
Anthroposophical Science
Anthroposophical Science
Anthroposophical Science
Rudolf Steiner, founder of the Waldorf Schools, developed Anthroposophy, a science based on psychic perception of hidden elements in nature and reality. Olive Whicher and George Adams extended projective geometry into a study of spiritual to material spaces. Students of Gann find invaluable insights into Steiner's system, as taught by Dr. Baumring.
Metaphysical Biography
Biography
Biography
One can learn much by studying the lives and achievements of the great thinkers who have shaped human history and culture. In our biographical library we have a collection of rare texts which complement theoretical study by allowing deeper insight into the characters and deeds of many significant philosophers.
Translation Society
View Sacred Science Translation Society pages
View Sacred Science Translation Society pages
The Sacred Science Translation Society began in 2004 as a project to translate important and rare works on Cosmology and Esoteric Science into English. Donors and Contributions raised $40,000 to translate masterpieces from French and German on critical subjects in Harmonics, Geometry, Esoteric Mathematics, and Ancient Cosmology.
Aether Physics
Aether Physics
Aether Physics
Since Plato the principle of Aether, a subtle universal plenum filling space and responsible for propagating forces and energies, along with Earth, Air, Fire and Water, has been a core universal element. Until the late 19th century, scientists, including Einstein, and most cosmological systems, incorporated the principle of Aether as being fundamental.
Chaos Theory
Chaos Theory
Chaos Theory
Non-linear dynamic mathematics, known as Chaos Theory, seeks order in seeming random patterns, exploring subjects like Fractals, System Mechanics, Lorentz Attractors, and more. Dr. Baumring originated the idea that Chaos theory provided insight into market phenomena, and later the great Mandelbrot tried to apply Chaos theory to the markets.
Vibrational Radiesthesia
Vibrational Radiesthesia
Vibrational Radiesthesia
There is a long tradition of the use of instruments to read subtle energy forces in nature, through the use of subtle measuring devices like dowsing rods and pendulums. The Jesuits were famous for finding water sources, showing advanced knowledge of using these techniques. The scientific name for this practice is Vibrational Radiesthesia.
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