Search preferences
Skip to main search results

Search filters

Product Type

  • All Product Types 
  • Books (5)
  • Magazines & Periodicals (No further results match this refinement)
  • Comics (No further results match this refinement)
  • Sheet Music (No further results match this refinement)
  • Art, Prints & Posters (No further results match this refinement)
  • Photographs (No further results match this refinement)
  • Maps (No further results match this refinement)
  • Manuscripts & Paper Collectibles (No further results match this refinement)

Condition Learn more

  • New (5)
  • As New, Fine or Near Fine (No further results match this refinement)
  • Very Good or Good (No further results match this refinement)
  • Fair or Poor (No further results match this refinement)
  • As Described (No further results match this refinement)

Binding

Collectible Attributes

Language (1)

Price

Custom price range (US$)

Seller Location

  • Kapanadze, Davit

    Language: English

    Published by AuthorHouse UK, 2026

    ISBN 13: 9798823096607

    Seller: California Books, Miami, FL, U.S.A.

    Seller rating 4 out of 5 stars 4-star rating, Learn more about seller ratings

    Contact seller

    US$ 19.00

    Free Shipping
    Ships within U.S.A.

    Quantity: Over 20 available

    Add to basket

    Condition: New.

  • Kapanadze, Davit

    Language: English

    Published by AuthorHouse UK, 2026

    ISBN 13: 9798823096607

    Seller: PBShop.store UK, Fairford, GLOS, United Kingdom

    Seller rating 5 out of 5 stars 5-star rating, Learn more about seller ratings

    Contact seller

    US$ 19.81

    US$ 4.39 shipping
    Ships from United Kingdom to U.S.A.

    Quantity: Over 20 available

    Add to basket

    PAP. Condition: New. New Book. Shipped from UK. Established seller since 2000.

  • Davit Kapanadze

    Language: English

    Published by AuthorHouse, Bloomington, 2026

    ISBN 13: 9798823096607

    Seller: AussieBookSeller, Truganina, VIC, Australia

    Seller rating 5 out of 5 stars 5-star rating, Learn more about seller ratings

    Contact seller

    Print on Demand

    US$ 31.54

    US$ 37.00 shipping
    Ships from Australia to U.S.A.

    Quantity: 1 available

    Add to basket

    Paperback. Condition: new. Paperback. This paper presents an algebraic and geometric-functional approach to introducing the derivative for elementary functions without using limits. The derivative is defined as a functional correspondence between the abscissa of a point on the graph of a function and the slope of the unique tangent line drawn at that point (the X-K correspondence). The method is developed systematically starting from single-variable polynomial functions by introducing the notions of multiple roots and tangency through an algebraic condition of repeated intersection. On this foundation, the derivative function is constructed and key differentiation rules are established, including the sum, product, quotient, and composite function rules. The approach is then extended to rational power functions, exponential functions, logarithmic functions with an arbitrary base, and trigonometric functions, yielding the same derivative formulas as in classical analysis. Finally, the increment of a function and the differential are interpreted geometrically via the tangent line, and the classical limit definition of the derivative arises as an analytical formalization of this geometric differential. The results demonstrate both mathematical consistency and strong pedagogical potential for secondary and undergraduate instruction. This item is printed on demand. Shipping may be from our Sydney, NSW warehouse or from our UK or US warehouse, depending on stock availability.

  • Davit Kapanadze

    Language: English

    Published by AuthorHouse, Bloomington, 2026

    ISBN 13: 9798823096607

    Seller: CitiRetail, Stevenage, United Kingdom

    Seller rating 5 out of 5 stars 5-star rating, Learn more about seller ratings

    Contact seller

    Print on Demand

    US$ 24.04

    US$ 49.39 shipping
    Ships from United Kingdom to U.S.A.

    Quantity: 1 available

    Add to basket

    Paperback. Condition: new. Paperback. This paper presents an algebraic and geometric-functional approach to introducing the derivative for elementary functions without using limits. The derivative is defined as a functional correspondence between the abscissa of a point on the graph of a function and the slope of the unique tangent line drawn at that point (the X-K correspondence). The method is developed systematically starting from single-variable polynomial functions by introducing the notions of multiple roots and tangency through an algebraic condition of repeated intersection. On this foundation, the derivative function is constructed and key differentiation rules are established, including the sum, product, quotient, and composite function rules. The approach is then extended to rational power functions, exponential functions, logarithmic functions with an arbitrary base, and trigonometric functions, yielding the same derivative formulas as in classical analysis. Finally, the increment of a function and the differential are interpreted geometrically via the tangent line, and the classical limit definition of the derivative arises as an analytical formalization of this geometric differential. The results demonstrate both mathematical consistency and strong pedagogical potential for secondary and undergraduate instruction. This item is printed on demand. Shipping may be from our UK warehouse or from our Australian or US warehouses, depending on stock availability.

  • Davit Kapanadze

    Language: English

    Published by Authorhouse UK, 2026

    ISBN 13: 9798823096607

    Seller: AHA-BUCH GmbH, Einbeck, Germany

    Seller rating 5 out of 5 stars 5-star rating, Learn more about seller ratings

    Contact seller

    Print on Demand

    US$ 25.13

    US$ 68.85 shipping
    Ships from Germany to U.S.A.

    Quantity: 2 available

    Add to basket

    Taschenbuch. Condition: Neu. nach der Bestellung gedruckt Neuware - Printed after ordering - This paper presents an algebraic and geometric-functional approachto introducing the derivative for elementary functions without usinglimits. The derivative is defined as a functional correspondencebetween the abscissa of a point on the graph of a function andthe slope of the unique tangent line drawn at that point (the X-Kcorrespondence). The method is developed systematically startingfrom single-variable polynomial functions by introducing the notionsof multiple roots and tangency through an algebraic condition ofrepeated intersection. On this foundation, the derivative functionis constructed and key differentiation rules are established,including the sum, product, quotient, and composite functionrules. The approach is then extended to rational power functions,exponential functions, logarithmic functions with an arbitrary base,and trigonometric functions, yielding the same derivative formulasas in classical analysis. Finally, the increment of a function and thedifferential are interpreted geometrically via the tangent line, andthe classical limit definition of the derivative arises as an analyticalformalization of this geometric differential. The results demonstrateboth mathematical consistency and strong pedagogical potentialfor secondary and undergraduate instruction.