Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 0
Book Description
The report contains ten place tables of the Jacobian elliptic functions am(u, k) sn(n, k) cn(u, k) dn(u, k), E(am(u, k)) where u = the integral from zero to phi of (d(theta)/the square root of (1-(k squared)(sin squared theta))); am(u, k) = phi; sn(u, k) = sin phi; cn(u, k) = cos phi; dn(u, k) = the square root of (1 - (k squared)(sin squared phi)); E(phi, k) = the integral from zero to phi of the square root of (1 - (k squared)(sin squared theta))d(theta) for k squared = .950 (.001).999, u = 0(.01)K(k) where K(k) = the integral from zero to pi/2 of (d(theta)/the square root of (1 - (k squared)(sin squared theta)))
Ten Place Tables of the Jacobian Elliptic Functions: Part III
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 0
Book Description
The report contains ten place tables of the Jacobian elliptic functions am(u, k) sn(n, k) cn(u, k) dn(u, k), E(am(u, k)) where u = the integral from zero to phi of (d(theta)/the square root of (1-(k squared)(sin squared theta))); am(u, k) = phi; sn(u, k) = sin phi; cn(u, k) = cos phi; dn(u, k) = the square root of (1 - (k squared)(sin squared phi)); E(phi, k) = the integral from zero to phi of the square root of (1 - (k squared)(sin squared theta))d(theta) for k squared = .950 (.001).999, u = 0(.01)K(k) where K(k) = the integral from zero to pi/2 of (d(theta)/the square root of (1 - (k squared)(sin squared theta)))
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 0
Book Description
The report contains ten place tables of the Jacobian elliptic functions am(u, k) sn(n, k) cn(u, k) dn(u, k), E(am(u, k)) where u = the integral from zero to phi of (d(theta)/the square root of (1-(k squared)(sin squared theta))); am(u, k) = phi; sn(u, k) = sin phi; cn(u, k) = cos phi; dn(u, k) = the square root of (1 - (k squared)(sin squared phi)); E(phi, k) = the integral from zero to phi of the square root of (1 - (k squared)(sin squared theta))d(theta) for k squared = .950 (.001).999, u = 0(.01)K(k) where K(k) = the integral from zero to pi/2 of (d(theta)/the square root of (1 - (k squared)(sin squared theta)))
Ten Place Tables of the Jacobian Elliptic Functions
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 408
Book Description
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 408
Book Description
Ten Place Tables of the Jacobian Elliptic Functions: ARL71-0081
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 496
Book Description
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 496
Book Description
Ten Place Tables of the Jacobian Elliptic Functions: Arguments at rational functions of the quarter period. ARL72-0019
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 416
Book Description
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 416
Book Description
Ten Place Tables of the Jacobian Elliptic Functions
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 449
Book Description
The report contains ten place tables of the Jacobian elliptic functions am(u,k) sn(n,k) cn(u,k) dn(u,k), E(am(u,k)) where u = the integral from zero to phi of ( d(theta)/the square root of (1-(k squared)(sin squared theta))); am(u,k) = phi; sn(u,k) = sin phi; cn(u,k) = cos phi; dn(u,k) = the square root of (1 - (k squared)(sin squared phi)); E(phi,k) = the integral from zero to phi of the square root of (1 - (k squared)(sin squared theta))d(theta) for k squared = .950 (.001).999, u = 0(.01)K(k) where K(k) = the integral from zero to pi/2 of (d(theta)/the square root of (1 - (k squared)(sin squared theta))).
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 449
Book Description
The report contains ten place tables of the Jacobian elliptic functions am(u,k) sn(n,k) cn(u,k) dn(u,k), E(am(u,k)) where u = the integral from zero to phi of ( d(theta)/the square root of (1-(k squared)(sin squared theta))); am(u,k) = phi; sn(u,k) = sin phi; cn(u,k) = cos phi; dn(u,k) = the square root of (1 - (k squared)(sin squared phi)); E(phi,k) = the integral from zero to phi of the square root of (1 - (k squared)(sin squared theta))d(theta) for k squared = .950 (.001).999, u = 0(.01)K(k) where K(k) = the integral from zero to pi/2 of (d(theta)/the square root of (1 - (k squared)(sin squared theta))).
Ten Place Tables of the Jacobian Elliptic Functions. Part III.
Author:
Publisher:
ISBN:
Category :
Languages : en
Pages : 455
Book Description
The report contains ten place tables of the Jacobian elliptic functions am(u, k) sn(n, k) cn(u, k) dn(u, k), E(am(u, k)) where u = the integral from zero to phi of (d(theta)/the square root of (1-(k squared)(sin squared theta))); am(u, k) = phi; sn(u, k) = sin phi; cn(u, k) = cos phi; dn(u, k) = the square root of (1 - (k squared)(sin squared phi)); E(phi, k) = the integral from zero to phi of the square root of (1 - (k squared)(sin squared theta))d(theta) for k squared = .950 (.001).999, u = 0(.01)K(k) where K(k) = the integral from zero to pi/2 of (d(theta)/the square root of (1 - (k squared)(sin squared theta))). (Author).
Publisher:
ISBN:
Category :
Languages : en
Pages : 455
Book Description
The report contains ten place tables of the Jacobian elliptic functions am(u, k) sn(n, k) cn(u, k) dn(u, k), E(am(u, k)) where u = the integral from zero to phi of (d(theta)/the square root of (1-(k squared)(sin squared theta))); am(u, k) = phi; sn(u, k) = sin phi; cn(u, k) = cos phi; dn(u, k) = the square root of (1 - (k squared)(sin squared phi)); E(phi, k) = the integral from zero to phi of the square root of (1 - (k squared)(sin squared theta))d(theta) for k squared = .950 (.001).999, u = 0(.01)K(k) where K(k) = the integral from zero to pi/2 of (d(theta)/the square root of (1 - (k squared)(sin squared theta))). (Author).
Ten Place Tables of the Jacobian Elliptic Functions: ARL71-0081
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 470
Book Description
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 470
Book Description
Ten Place Tables of the Jacobian Elliptic Functions
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 420
Book Description
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 420
Book Description
Ten Place Tables of the Jacobian Elliptic Functions
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 408
Book Description
The report contains ten place tables of the Jacobian elliptic functions am(u, k), sn(u, k), cn(u, k), dn(u, k) where u = mk/n, for K squared = 0(.01).99, m = 0(1)(n-1), n = 11(1)20. This tabulation was suggested by Dr. Irving L. Weiner of Multimetrics as an aid in the design and analysis of ultrasharp elliptic filters.
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 408
Book Description
The report contains ten place tables of the Jacobian elliptic functions am(u, k), sn(u, k), cn(u, k), dn(u, k) where u = mk/n, for K squared = 0(.01).99, m = 0(1)(n-1), n = 11(1)20. This tabulation was suggested by Dr. Irving L. Weiner of Multimetrics as an aid in the design and analysis of ultrasharp elliptic filters.
Ten Place Tables of the Jacobian Elliptic Functions: Arguments at rational functions of the quarter period. ARL72-0019
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Functions, Elliptic
Languages : en
Pages : 416
Book Description
Publisher:
ISBN:
Category : Functions, Elliptic
Languages : en
Pages : 416
Book Description