Book contents
- Frontmatter
- ADVERTISEMENT
- Contents
- CLASSIFICATION
- 799. On curvilinear coordinates
- 800. Note on the standard solutions of a system of linear equations
- 801. On seminvariants
- 802. Note on Captain MacMahons paper “On the differential equation
- 803. On Mr Anglin's formula for the successive powers of the root of an algebraical equation
- 804. On the elliptic-function solution of the equation
- 805. Note on Abel's theorem
- 806. Determination of the order of a surface
- 807. A proof of Wilson's theorem
- 808. Note on a form of the modular equation in the transformation of the third order
- 809. Schröter's construction of the regular pentagon
- 810. Note on a system of equations
- 811. On the linear transformation of the theta-functions
- 812. On Archimedes' theorem for the surface of a cylinder
- 813. [Note on Mr Griffiths'.paper “On a deduction from the elliptic-integral formula y = sin(A + B+C+…)”]
- 814. On double algebra
- 815. The binomial equation xp−1 = 0; quinquisection. Second part
- 816. On the bitangents of a plane quartic
- 817. On the sixteen-nodal quartic surface
- 818. Note on hyperelliptic integrals of the first order
- 819. On two cases of the quadric transformation between two planes
- 820. On a problem of analytical geometry
- 821. On the geometrical representation of an equation between two variables
- 822. On associative imaginaries
- 823. On the geometrical interpretation of certain formulae in elliptic functions
- 824. Note on the formulœ of trigonometry
- 825. A memoir on the Abelian and Theta Functions
- 826. Note on a partition series
- 827. On the non-Euclidian plane geometry
- 828. A memoir on seminvariants
- 829. Tables of the symmetric functions of the roots, to the degree 10, for the form
- 830. Non-unitary partition tables
- 831. Seminvariant tables
- 832. Note on an appaeent difficulty in the theory of curves, when the coordinates of a point are given as functions of a variable parameter
- 833. On a formula in elliptic functions
- 834. On the addition of the elliptic functions
- 835. On Cardan's solution of a cubic equation
- 836. On the quaternion equation qQ — Qq′=0
- 837. On the so-called D'Alembert Carnot geometrical paradox
- 838. On the twisted cubics upon a quadric surface
- 839. On the matrical equation qQ — Qq′ = 0
- 840. On Mascheronis geometry of the compass
- 841. On a differential operator
- 842. On the value of tan (sin θ) — sin (tan θ)
- 843. On the quadri-quadric curve in connexion with the theory of elliptic functions
- 844. On a theorem relating to seminvariants
- 845. On the orthomorphosis of the circle into the parabola
- 846. A verification in regard to the linear transformation of the theta-functions
- 847. On the theory of seminvariants
- 848. On the transformation of the double theta-functions
- 849. On the invariants of a linear differential equation
- 850. On linear differential equations
- 851. On linear differential equations: the theory of decomposition
- 852. Note sur le mémoire de M. Picard “Sur les intégrates de différentielles totales algébriques de première espèce”
- 853. Note on a formula for Δn0i/ni when n, i are very large numbers
- 854. An algebraical transformation
- 855. Solution of (a, b, c, d)
- 856. Note on a cubic equation
- 857. Analytical geometrical note on the conic
- 858. Comparison of the Weierstrassian and Jacobian elliptic functions
- 859. On the complex of lines which meet a unicursal quartic curve
- 860. On Briot and Bouquet's theory of the differential equation
- 861. Note on a formula relating to the zero-value of a theta-function
- 862. Note on the theory of linear differential equations
- 863. Note on the theory of linear differential equations
- 864. On Rudio's inverse centro-surface
- 865. On multiple algebra
- 866. Note on Kiepert's L-equations, in the transformation of elliptic functions
- 867. Note on the Jacobian sextic equation
- 868. On the intersection of curves
- 869. On the transformation of elliptic functions
- 870. On the tbansformation of elliptic functions (sequel)
- 871. A case of complex multiplication with imaginary modulus arising out of the cubic transformation in elliptic functions
- 872. On the finite number of the covariants of a binary quantic
- 873. System of equations for three circles which cut each other at given angles
- 874. Note on the Legendrian coefficients of the second kind
- 875. On the system of three circles which cut each other at given angles and have their centres in a line
- 876. On systems of rays
- 877. Note on the two relations connecting the distances of four points on a circle
- 878. Note on the anharmonic ratio equation
- 879. Note on the differential equation
- 880. Note on the relation between the distance of five points in space
- 881. On Hermite's H-product theorem
- 882. A correspondence of confocal Cartesians with the right lines of a hyperboloid
- 883. Analytical formulæ in regard to an octad of points
- 884. Note sur les surfaces minima et le théorème de Joachimsthal
- 885. On the Diophantine relation, y2 + y′2 = Square
- 886. On the surfaces with plane or spherical curves of curvature
- 887. On the theory of groups
811. On the linear transformation of the theta-functions
Published online by Cambridge University Press: 07 October 2011
Book contents
- Frontmatter
- ADVERTISEMENT
- Contents
- CLASSIFICATION
- 799. On curvilinear coordinates
- 800. Note on the standard solutions of a system of linear equations
- 801. On seminvariants
- 802. Note on Captain MacMahons paper “On the differential equation
- 803. On Mr Anglin's formula for the successive powers of the root of an algebraical equation
- 804. On the elliptic-function solution of the equation
- 805. Note on Abel's theorem
- 806. Determination of the order of a surface
- 807. A proof of Wilson's theorem
- 808. Note on a form of the modular equation in the transformation of the third order
- 809. Schröter's construction of the regular pentagon
- 810. Note on a system of equations
- 811. On the linear transformation of the theta-functions
- 812. On Archimedes' theorem for the surface of a cylinder
- 813. [Note on Mr Griffiths'.paper “On a deduction from the elliptic-integral formula y = sin(A + B+C+…)”]
- 814. On double algebra
- 815. The binomial equation xp−1 = 0; quinquisection. Second part
- 816. On the bitangents of a plane quartic
- 817. On the sixteen-nodal quartic surface
- 818. Note on hyperelliptic integrals of the first order
- 819. On two cases of the quadric transformation between two planes
- 820. On a problem of analytical geometry
- 821. On the geometrical representation of an equation between two variables
- 822. On associative imaginaries
- 823. On the geometrical interpretation of certain formulae in elliptic functions
- 824. Note on the formulœ of trigonometry
- 825. A memoir on the Abelian and Theta Functions
- 826. Note on a partition series
- 827. On the non-Euclidian plane geometry
- 828. A memoir on seminvariants
- 829. Tables of the symmetric functions of the roots, to the degree 10, for the form
- 830. Non-unitary partition tables
- 831. Seminvariant tables
- 832. Note on an appaeent difficulty in the theory of curves, when the coordinates of a point are given as functions of a variable parameter
- 833. On a formula in elliptic functions
- 834. On the addition of the elliptic functions
- 835. On Cardan's solution of a cubic equation
- 836. On the quaternion equation qQ — Qq′=0
- 837. On the so-called D'Alembert Carnot geometrical paradox
- 838. On the twisted cubics upon a quadric surface
- 839. On the matrical equation qQ — Qq′ = 0
- 840. On Mascheronis geometry of the compass
- 841. On a differential operator
- 842. On the value of tan (sin θ) — sin (tan θ)
- 843. On the quadri-quadric curve in connexion with the theory of elliptic functions
- 844. On a theorem relating to seminvariants
- 845. On the orthomorphosis of the circle into the parabola
- 846. A verification in regard to the linear transformation of the theta-functions
- 847. On the theory of seminvariants
- 848. On the transformation of the double theta-functions
- 849. On the invariants of a linear differential equation
- 850. On linear differential equations
- 851. On linear differential equations: the theory of decomposition
- 852. Note sur le mémoire de M. Picard “Sur les intégrates de différentielles totales algébriques de première espèce”
- 853. Note on a formula for Δn0i/ni when n, i are very large numbers
- 854. An algebraical transformation
- 855. Solution of (a, b, c, d)
- 856. Note on a cubic equation
- 857. Analytical geometrical note on the conic
- 858. Comparison of the Weierstrassian and Jacobian elliptic functions
- 859. On the complex of lines which meet a unicursal quartic curve
- 860. On Briot and Bouquet's theory of the differential equation
- 861. Note on a formula relating to the zero-value of a theta-function
- 862. Note on the theory of linear differential equations
- 863. Note on the theory of linear differential equations
- 864. On Rudio's inverse centro-surface
- 865. On multiple algebra
- 866. Note on Kiepert's L-equations, in the transformation of elliptic functions
- 867. Note on the Jacobian sextic equation
- 868. On the intersection of curves
- 869. On the transformation of elliptic functions
- 870. On the tbansformation of elliptic functions (sequel)
- 871. A case of complex multiplication with imaginary modulus arising out of the cubic transformation in elliptic functions
- 872. On the finite number of the covariants of a binary quantic
- 873. System of equations for three circles which cut each other at given angles
- 874. Note on the Legendrian coefficients of the second kind
- 875. On the system of three circles which cut each other at given angles and have their centres in a line
- 876. On systems of rays
- 877. Note on the two relations connecting the distances of four points on a circle
- 878. Note on the anharmonic ratio equation
- 879. Note on the differential equation
- 880. Note on the relation between the distance of five points in space
- 881. On Hermite's H-product theorem
- 882. A correspondence of confocal Cartesians with the right lines of a hyperboloid
- 883. Analytical formulæ in regard to an octad of points
- 884. Note sur les surfaces minima et le théorème de Joachimsthal
- 885. On the Diophantine relation, y2 + y′2 = Square
- 886. On the surfaces with plane or spherical curves of curvature
- 887. On the theory of groups
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- The Collected Mathematical Papers , pp. 50 - 55Publisher: Cambridge University PressPrint publication year: 2009First published in: 1897