Ten Place Tables of the Jacobian Elliptic Functions: Part III PDF Download
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Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 0
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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: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 0
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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: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 408
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Book Description
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 496
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Book Description
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 416
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Book Description
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 449
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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:
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ISBN:
Category :
Languages : en
Pages : 455
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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).
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 470
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Book Description
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 420
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Book Description
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Elliptic functions
Languages : en
Pages : 408
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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.
Author: Henry E. Fettis
Publisher:
ISBN:
Category : Functions, Elliptic
Languages : en
Pages : 416
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Book Description
