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- Re: JSH: Referral to NY Times "End the University as We Know It"
- Re: Groebner
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- Re: JSH: Referral to NY Times "End the University as We Know It"
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- From: alainverghote@xxxxxxxxx
- Re: Rolle's Theorem
- Re: Rolle's Theorem
- Re: A function f ( x , m , n ) for which f ' ( x ) = 0 ONLY when gcd( m, n) > 1 for 1 < n < m and m, n odd ?
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- Re: JSH: Referral to NY Times "End the University as We Know It"
- Re: Why not also consider n-tori, n-proj planes, n-K bottles etc etc instead of
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- Re: Possibility of sieving a non trivial tree in 3n+1?
- Re: riccati and wronski did it (generalised trigonometry)
- Re: Possibility of sieving a non trivial tree in 3n+1?
- Re: A function f ( x , m , n ) for which f ' ( x ) = 0 ONLY when gcd( m, n) > 1 for 1 < n < m and m, n odd ?
- Re: Coin tossing
- Re: Possibility of sieving a non trivial tree in 3n+1?
- Re: Galois Extension of rings
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- Re: Halving problem
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- Re: Rolle's Theorem
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- From: Mariano Suárez-Alvarez
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- Re: A function f ( x , m , n ) for which f ' ( x ) = 0 ONLY when gcd( m, n) > 1 for 1 < n < m and m, n odd ?
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- Re: Possibility of sieving a non trivial tree in 3n+1?
- Re: A function f ( x , m , n ) for which f ' ( x ) = 0 ONLY when gcd( m, n) > 1 for 1 < n < m and m, n odd ?
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- Re: A function f ( x , m , n ) for which f ' ( x ) = 0 ONLY when gcd( m, n) > 1 for 1 < n < m and m, n odd ?
- Re: A function f ( x , m , n ) for which f ' ( x ) = 0 ONLY when gcd( m, n) > 1 for 1 < n < m and m, n odd ?
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- Re: CMS: where are the zeroes ?
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- Re: Why are nilpotent elements bad?
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- Re: Trigonometric equation help
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- Re: CMS: where are the zeroes ?
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- Re: f'(x) = g'(x) imples f(x) - g(x) is a constant
- Re: f'(x) = g'(x) imples f(x) - g(x) is a constant
- Re: f'(x) = g'(x) imples f(x) - g(x) is a constant
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- Why are nilpotent elements bad?
- Re: CMS: where are the zeroes ?
- Re: Why Don't Einsteinians Search for their Aether?
- Re: Trigonometric equation help
- Re: Tetrahedron
- Re: Renewal process
- Re: Renewal process
- Re: Tetrahedron
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- Re: Covering map and topological group
- finite group
- Re: Trigonometric equation help
- Re: Trigonometric equation help
- Re: Trigonometric equation help
- 1D Heat conduction equation with everything specified on one end.
- Re: Covering map and topological group
- Re: Trigonometric equation help
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- Re: Fixd point
- Re: A nonselfadjoint problem
- Tetrahedron
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- Re: CMS: where are the zeroes ?
- Re: Covering map and topological group
- Re: f'(x) = g'(x) imples f(x) - g(x) is a constant
- Re: Farey sequence code in Wikipedia
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- From: Stephen J. Herschkorn
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- Re: Bound for quotient of eigenvalues
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- Probability question
- Re: Farey sequence code in Wikipedia
- Re: Is there any forum where you can discuss how to teach math concepts?
- Re: Farey sequence code in Wikipedia
- Re: Is there any forum where you can discuss how to teach math concepts?
- Re: Farey sequence code in Wikipedia
- Is there any forum where you can discuss how to teach math concepts?
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- Re: f'(x) = g'(x) imples f(x) - g(x) is a constant
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- Re: f'(x) = g'(x) imples f(x) - g(x) is a constant
- Re: General Solution of a Functional Equation
- Re: How Many Eth Roots Do Nonzero Complex Numbers Have?
- Re: Rude math :-)
- Re: Normal Distributions
- Re: Flaw in "An Update on the 4CT" by Robin Thomas?
- Re: commutator subgroup of Dihedral group on n-polygon
- From: Richard L. Peterson
- Re: f'(x) = g'(x) imples f(x) - g(x) is a constant
- Re: General Solution of a Functional Equation
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- Re: CMS: where are the zeroes ?
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- Re: Covering map and topological group
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- Re: What powers of 11 aside from 0,1,2,3,4 are palindromes? (if any)
- Re: Rude math :-)
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- Re: CMS: where are the zeroes ?
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- How Many Eth Roots Do Nonzero Complex Numbers Have?
- Re: f'(x) = g'(x) imples f(x) - g(x) is a constant
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- Re: f'(x) = g'(x) imples f(x) - g(x) is a constant
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- Re: Factorization of a^3 + b^3 + c^3 - 3abc
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- can anyone tell me a little about this puzzle - quartering squares & the pythagorean theorem
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- From: Mariano Suárez-Alvarez
- Re: What powers of 11 aside from 0,1,2,3,4 are palindromes? (if any)
- Re: Factorization of a^3 + b^3 + c^3 - 3abc
- Re: Factorization of a^3 + b^3 + c^3 - 3abc
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- Re: Integral of sin(x)/x
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- Re: Integral of sin(x)/x
- Re: What powers of 11 aside from 0,1,2,3,4 are palindromes? (if any)
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- Re: Rude math :-)
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- Re: commutator subgroup of Dihedral group on n-polygon
- Re: What powers of 11 aside from 0,1,2,3,4 are palindromes? (if any)
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- Re: Integral of sin(x)/x
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- Re: What powers of 11 aside from 0,1,2,3,4 are palindromes? (if any)
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- Re: What powers of 11 aside from 0,1,2,3,4 are palindromes? (if any)
- From: Richard L. Peterson
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- Re: What powers of 11 aside from 0,1,2,3,4 are palindromes? (if any)
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- From: Mariano Suárez-Alvarez
- Re: A function f ( x , m , n ) for which f ' ( x ) = 0 ONLY when gcd( m, n) > 1 for 1 < n < m and m, n odd ?
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- From: Mariano Suárez-Alvarez
- Re: Integral of sin(x)/x
- Re: Rude math :-)
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- Re: > Trace of a product of matrices is nondegenerate? (generalization?)
- Re: -- Trace of a product of two matrices is nondegenerate
- Re: -- Trace of a product of two matrices is nondegenerate
- Re: > Trace of a product of matrices is nondegenerate? (generalization?)
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- Re: -- Product and inverses of elements of the form x^2 + ay^2
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- Re: What are hypercomplex numbers for?
- Re: JSH: Could they be aliens?
- Nup nup lo lo
- #395 sqrt2 = 1d41421356...99999L ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: Construct compact set of R whose limit points form a countable set
- Re: Construct compact set of R whose limit points form a countable set
- Re: Q and Q[0,1] homeomorphic?
- Re: optimization problem!
- Re: Construct compact set of R whose limit points form a countable set
- Re: JSH: Understanding pain and why they destroyed the journal
- Re: Mod[a[n],p]
- #394 Operator-Function-Complete; Euclidean Completeness Postulate ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: thread closed: "A problem of set geometry"
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- Re: what is JSH ? why JSH ?
- Re: JSH: May I recommend a journal?
- Re: Understanding pain and why they destroyed the journal
- Can someone with Mathematica pls DSolve this for me?
- Re: JSH: Understanding pain and why they destroyed the journal
- JSH: May I recommend a journal?
- Re: Question About the Eth Root of E
- Re: JSH: Understanding pain and why they destroyed the journal
- optimization problem!
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- Re: JSH: Understanding pain and why they destroyed the journal
- Tower of Hanoi related to an interesting sequence with the summing of moves
- Re: JSH: Understanding pain and why they destroyed the journal
- Re: Q and Q[0,1] homeomorphic?
- From: Stephen J. Herschkorn
- Re: JSH: Understanding pain and why they destroyed the journal
- Re: A variant on the "Secret Santa"
- From: cbrown@xxxxxxxxxxxxxxxxx
- Re: .9 repeating
- JSH: Understanding pain and why they destroyed the journal
- Question About the Eth Root of E
- Re: what is JSH ? why JSH ?
- Re: what is JSH ? why JSH ?
- Re: Little question ...
- Re: what is JSH ? why JSH ?
- Re: JSH: Understanding the 'why' of Pell's Equation
- Re: god's set-theoretical universe
- Re: god's set-theoretical universe
- Re: JSH: I feel sorry for him
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- Re: god's set-theoretical universe
- Re: Artinian modules
- Re: god's set-theoretical universe
- Re: god's set-theoretical universe
- Re: MathForum
- Re: MathForum
- Re: MathForum
- Re: Little question ...
- Re: what is JSH ? why JSH ?
- Re: |x + y|^p ? 2^p (|x|^p + |y|^p)
- a first course in probability book
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- Re: need help with measure theory problem(Egorov's Theorem)
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- Re: What is the roots of polynomial?
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- #392 new algebraic concept-- Operator-Function-Complete, solving Transcendental and NP-problem ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: MathForum
- Re: MathForum
- Re: MathForum
- Re: MathForum
- Re: Math conference with my participation
- Re: MathForum
- need help with measure theory problem(Egorov's Theorem)
- Re: Solving an equation
- Re: |x + y|^p ˜ 2^p (|x|^p + |y|^p)
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- Re: MathForum
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- Re: Save a theorem
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- Re: JSH: sqrt(n^2 - 2) and Pell's Equation
- Save a theorem
- Re: Math conference with my participation
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- From: alainverghote@xxxxxxxxx
- #391 new algebraic concept-- Operator-Complete, solving Transcendental and NP-problem ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: Solving an equation
- Re: module over noetherian ring
- Re: Locally Compact Hausdorff Space?
- Re: Solving an equation
- Re: JSH: Understanding the 'why' of Pell's Equation
- Re: Sudoku like puzzle
- From: Seán O'Leathlóbhair
- Re: JSH: Understanding the 'why' of Pell's Equation
- Re: Mod[a[n],p]
- Solution manual to Computer Networks, 4th Ed., by Andrew S. Tanenbaum
- Re: Sudoku like puzzle
- Re: A variant on the "Secret Santa"
- Re: does standard brownian motion converge to 0 a.s.
- Re: JSH: sqrt(n^2 - 2) and Pell's Equation
- Re: Sudoku like puzzle
- Re: Comprehensive Solution Manual for Textbooks
- Re: Mod[a[n],p]
- Solving an equation
- Mod[a[n],p]
- Re: What are hypercomplex numbers for?
- Re: - UFDs; solution to an equation with integer coefficients
- The dark side of the loon
- Re: Q and Q[0,1] homeomorphic?
- module over noetherian ring
- Re: JSH: Understanding the 'why' of Pell's Equation
- |x + y|^p ≤ 2^p (|x|^p + |y|^p)
- Re: - UFDs; solution to an equation with integer coefficients
- Re: Q and Q[0,1] homeomorphic?
- what is JSH ? why JSH ?
- #390 eke out a little progress; sqrt2 = 1d414...9995L and sqrt3 = 1d732...9995L ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: Q and Q[0,1] homeomorphic?
- Re: Little question ...
- what is monotonic spline fit ?
- Re: what is Math ?
- Re: Q and Q[0,1] homeomorphic?
- Re: Little question ...
- Re: A variant on the "Secret Santa"
- Re: two-to-one function
- Re: Q and Q[0,1] homeomorphic?
- - UFDs; solution to an equation with integer coefficients
- Re: what is Math ?
- #389 let me start over with the starting over; sqrt2 = 1d414...999L and sqrt3 = 1d732...999L ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- #388 let me start over with less mistakes; sqrt2 = 1d414...0 and sqrt3 = 1d732...0 ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: Engineering Mechanics: Dynamics, 6th Edition, Meriam, Kraige Solutions Manual
- Re: Little question ...
- From: Achava Nakhash, the Loving Snake
- Little question ...
- Re: Inverse of complete elliptic integrals
- Re: A variant on the "Secret Santa"
- From: cbrown@xxxxxxxxxxxxxxxxx
- Re: Higher dimensions
- Re: What are hypercomplex numbers for?
- Re: Neighborhoods
- Re: Locally Compact Hausdorff Space?
- Re: Locally Compact Hausdorff Space?
- From: Achava Nakhash, the Loving Snake
- Re: two-to-one function
- Re: JSH: Weird blind spots with Pell's Equation
- Re: does standard brownian motion converge to 0 a.s.
- Re: Algebraic Topology Problem (Massey. 2.4.3 )
- Re: two-to-one function
- Re: Neighborhoods
- What are hypercomplex numbers for?
- two-to-one function
- Neighborhoods
- Re: Q and Q[0,1] homeomorphic?
- From: Stephen J. Herschkorn
- Re: Q and Q[0,1] homeomorphic?
- Re: Inverse of complete elliptic integrals
- Re: Q and Q[0,1] homeomorphic?
- Re: #384 The axioms of both AP-Reals and AP-adics with the definition of finite = < 10^500 ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: #384 The axioms of both AP-Reals and AP-adics with the definition of finite = < 10^500 ; new book 2nd edition: New True Mathematics
- Re: does standard brownian motion converge to 0 a.s.
- Re: Locally Compact Hausdorff Space?
- Re: Locally Compact Hausdorff Space?
- Q and Q[0,1] homeomorphic?
- From: Stephen J. Herschkorn
- #386 What does analysis tell us as to sqrt2 = 1.414....9994L ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: does standard brownian motion converge to 0 a.s.
- From: Stephen J. Herschkorn
- Re: Sudoku like puzzle
- Re: Parametric Pell's Equation and circle
- Re: Locally Compact Hausdorff Space?
- Re: Locally Compact Hausdorff Space?
- Re: The Mathematics of Ignorance
- Re: Locally Compact Hausdorff Space?
- Re: Locally Compact Hausdorff Space?
- Re: What is the roots of polynomial?
- #385 BackView increasing our understanding of Irrational, Transcendental and sqrt2 = 1.414....9994L ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: JSH: sqrt(n^2 - 2) and Pell's Equation
- Re: Locally Compact Hausdorff Space?
- Locally Compact Hausdorff Space?
- Re: What is the roots of polynomial?
- Re: Semidirect product - References
- #384 The axioms of both AP-Reals and AP-adics with the definition of finite = < 10^500 ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: What is the roots of polynomial?
- Re: Inverse of complete elliptic integrals
- Re: What is the roots of polynomial?
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- #383 World's only two Archimedean Well-Ordered Fields and why p-adics are nonarchimedean ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: What is the roots of polynomial?
- Re: JSH: sqrt(n^2 - 2) and Pell's Equation
- Re: The Mathematics of Ignorance
- Re: The Mathematics of Ignorance
- Re: Algebraic Topology Problem (Massey. 2.4.3 )
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- From: alainverghote@xxxxxxxxx
- What is the roots of polynomial?
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- Re: Algebraic Topology Problem (Massey. 2.4.3 )
- Re: The Mathematics of Ignorance
- Re: god's set-theoretical universe
- Re: $50US prize for progression on equivalence between polysign P4 and RxC
- Re: Closure
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- From: alainverghote@xxxxxxxxx
- Inverse of complete elliptic integrals
- Sudoku like puzzle
- From: Seán O'Leathlóbhair
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- From: alainverghote@xxxxxxxxx
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- Re: Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- Solving ( f(x+1) -3)*f(x) + 2 = 0 , f(0) = 0
- From: alainverghote@xxxxxxxxx
- A NEW MATHEMATICAL CONTNUUM
- Re: does standard brownian motion converge to 0 a.s.
- Re: lmo + oml = 1089
- Re: Partitions of unity
- Re: References for a Counterexample in Topology
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- Re: JSH: sqrt(n^2 - 2) and Pell's Equation
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- SPAM
- Algebraic Topology Problem (Massey. 2.4.3 )
- Re: The Mathematics of Ignorance
- Re: The Mathematics of Ignorance
- Re: does standard brownian motion converge to 0 a.s.
- Re: sum of two uniform random variable
- Re: sum of two uniform random variable
- does standard brownian motion converge to 0 a.s.
- Re: MathForum
- Re: MathForum
- Semidirect product - References
- From: bell.charles62@xxxxxxxxxxxxxx
- Re: A variant on the "Secret Santa"
- #382 Axioms for AP-Reals ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Re: MathForum
- Re: A variant on the "Secret Santa"
- Re: Closure
- about tan n > n , n in N
- Re: Normalizers
- From: burkill.louis@xxxxxxxxxxxxxx
- Re: Normalizers
- From: burkill.louis@xxxxxxxxxxxxxx
- Distinct sums of reciprocals of partition numbers
- References for a Counterexample in Topology
- Re: JSH: Weird blind spots with Pell's Equation
- Re: Monotone Sequence
- Re: A variant on the "Secret Santa"
- From: cbrown@xxxxxxxxxxxxxxxxx
- Re: JSH: I feel sorry for them
- Re: Parametric Pell's Equation and circle
- Re: MathForum
- Closure
- Monotone Sequence
- Re: sum of two uniform random variable
- infinite substrings Re: #380 a 21st century better definition of Irrational, Rational, and Transcendental ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
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- From: plutonium . archimedes
- will need axiom for two decimal points Re: #379 Axioms for AP-Reals ; new book 2nd edition: New True Mathematics
- From: plutonium . archimedes
- Convergence Value
- Re: mathematical nomenclature
- Re: sum of two uniform random variable
- Re: sum of two uniform random variable
- Re: how to determine degeneracy of quadratic
- Re: JSH: Weird blind spots with Pell's Equation
- Re: sum of two uniform random variable
- Re: sum of two uniform random variable
- Re: MathForum
- Re: sum of two uniform random variable
- Re: sum of two uniform random variable
- Re: how to determine degeneracy of quadratic
- Re: JSH: Weird blind spots with Pell's Equation
- Re: how to determine degeneracy of quadratic
- Re: MathForum
- Re: MathForum
- Re: sum of two uniform random variable
- Re: sum of two uniform random variable
- Re: The Mathematics of Ignorance
- Re: Generalized eigenvalue problem
- Re: what are the uses with the Orthogonal polynomials ?
- Re: JSH: Weird blind spots with Pell's Equation
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- Re: The Mathematics of Ignorance
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- Re: Parametric Pell's Equation and circle
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- Re: The Mathematics of Ignorance
- Re: a "carpenter's ruler"-type problem for knots
- Re: The Mathematics of Ignorance
- Re: The Mathematics of Ignorance
- Re: JSH: Weird blind spots with Pell's Equation
- Re: what are the uses with the Orthogonal polynomials ?
- Re: Convergence Value
- Re: Find the area of common region
- Convergence Value
- Re: MathForum
- Re: The Mathematics of Ignorance
- Re: Generalized eigenvalue problem
- Re: mathematical nomenclature
- Re: JSH: Weird blind spots with Pell's Equation
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- Re: mathematical nomenclature
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- Re: Normalizers
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- Differentiation of asymptotics w.r.t. parameter
- Re: mathematical nomenclature
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- Re: Markov Chain with two transition matrices
- Re: MathForum
- Re: MathForum
- Re: Random choice of numbers
- Re: Why is Google Groups the most popular way to post ?
- Re: Converse to Riemann-Lebesgue lemma
- Re: Probability problem
- Re: MathForum
- Re: what are the uses with the Orthogonal polynomials ?
- Re: is nth partial fourier sum s_n(f) in L(T), Lp(T) or C(T)
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- Re: fourier series of f ' relative to f
- Re: f continuous, 2pi periodic; s_n(f) does not converge to f uniformly (as n-> infinity)
- Re: topological rings
- Re: fourier series of f ' relative to f
- Re: how to determine degeneracy of quadratic
- Re: fourier series of f ' relative to f
- Re: fourier series of f ' relative to f
- Re: fourier series of f ' relative to f
- Re: what are the uses with the Orthogonal polynomials ?
- Normalizers
- From: burkill.louis@xxxxxxxxxxxxxx
- Re: what are the uses with the Orthogonal polynomials ?
- Re: The Mathematics of Ignorance
- Re: topological rings
- Re: Find the area of common region
- Re: how to determine degeneracy of quadratic
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- Re: Find the area of common region
- Re: what are the uses with the Orthogonal polynomials ?
- Re: Parametric Pell's Equation and circle
- Free Particles/True Articles
- Re: what are the uses with the Orthogonal polynomials ?
- Re: MathForum
- Re: The Mathematics of Ignorance
- Re: The Mathematics of Ignorance
- what are the uses with the Orthogonal polynomials ?
- Re: Find area of two circles
- Re: Find area of two circles
- Re: Find area of two circles
- Re: Random choice of numbers
- Re: A variant on the "Secret Santa"
- Re: Find area of two circles
- Re: how to determine degeneracy of quadratic
- Re: Find the area of common region
- Re: Random choice of numbers
- Markov Chain with two transition matrices
- Re: how to determine degeneracy of quadratic
- how to determine degeneracy of quadratic
- re:Can a certain determination be made on a large composite such as rsa2048
- Re: f continuous, 2pi periodic; s_n(f) does not converge to f uniformly (as n-> infinity)
- Re: The Mathematics of Ignorance
- Re: The Mathematics of Ignorance
- Re: MathForum
- The Mathematics of Ignorance
- Re: Find the area of common region
- Re: MathForum
- Re: MathForum
- Re: JSH: Weird blind spots with Pell's Equation
- Re: .9 repeating
- Re: A variant on the "Secret Santa"
- Re: .9 repeating
- Re: Find the area of common region
- Re: Random choice of numbers
- Re: Find the area of common region
- Re: Polynomial approximation of Randomness ?
- topological rings
- Re: A variant on the "Secret Santa"
- Re: A variant on the "Secret Santa"
- Re: A variant on the "Secret Santa"
- Counting paths problem
- Re: A variant on the "Secret Santa"
- Re: Random choice of numbers
- Re: Random choice of numbers
- Re: fourier series of f ' relative to f
- Re: A variant on the "Secret Santa"
- Re: A variant on the "Secret Santa"
- Re: A variant on the "Secret Santa"
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- Re: Parametric Pell's Equation and circle
- Re: Parametric Pell's Equation and circle
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- Re: Generalized eigenvalue problem
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- Re: Random choice of numbers
- Re: Converse to Riemann-Lebesgue lemma
- Generalized eigenvalue problem
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- Re: fourier series of f ' relative to f
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- Re: fourier series of f ' relative to f
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- Introduction to spectral sequences
- Re: fourier series of f ' relative to f
- Re: to show that C[a,b] is subspace of Lp[a,b] (p finite)
- "Sir, a+b^n / z=x, hence God exists—reply!".
- Re: is nth partial fourier sum s_n(f) in L(T), Lp(T) or C(T)
- Re: fourier series of f ' relative to f
- Re: fourier series of f ' relative to f
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- Re: fourier series of f ' relative to f
- Re: Find the area of common region
- Re: Random choice of numbers
- Re: Random choice of numbers
- Re: Find the area of common region
- Re: fourier series of f ' relative to f
- Re: fourier series of f ' relative to f
- Re: Find the area of common region
- Re: Find the area of common region
- Re: Random choice of numbers
- Re: Random choice of numbers
- Re: to show that C[a,b] is subspace of Lp[a,b] (p finite)
- Re: .9 repeating
- Re: #357 Infinity in Physics-- electromagnetic potential; new book 2nd edition: New True Mathematics
- Find the area of common region
- Re: x_n converging to x "in normed space (V, || ||)"
- Re: Random choice of numbers
- Re: Random choice of numbers
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- Re: f continuous, 2pi periodic; s_n(f) does not converge to f uniformly (as n-> infinity)
- Re: Converse to Riemann-Lebesgue lemma
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- Re: fourier series of f ' relative to f
- Re: fourier series of f ' relative to f
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- Re: Random choice of numbers
- Re: Probability problem
- Re: Random choice of numbers
- Re: Random choice of numbers
- Re: Addition of rotations-
- Re: Partitions of unity
- Partitions of unity
- Re: what is Math ?
- Re: fourier series of f ' relative to f
- Re: x_n converging to x "in normed space (V, || ||)"
- Re: Uniform convergence
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- Re: x_n converging to x "in normed space (V, || ||)"
- Re: to show that C[a,b] is subspace of Lp[a,b] (p finite)
- Re: Random choice of numbers
- Re: Interior of a subset
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- Re: I am Isaac Newton. My identity had been proven though "Esdras II" and Nostradamus. I have a maths question. Maths about Nostradamus's prophecies.
- Re: I am Isaac Newton. My identity had been proven though "Esdras II" and Nostradamus. I have a maths question. Maths about Nostradamus's prophecies.
- Interior of a subset
- Re: Addition of rotations-
- Re: to show that C[a,b] is subspace of Lp[a,b] (p finite)
- Re: Converse to Riemann-Lebesgue lemma
- Re: Addition of rotations-
- Re: Random choice of numbers
- From: Stephen J. Herschkorn
- I am Isaac Newton. My identity had been proven though "Esdras II" and Nostradamus. I have a maths question. Maths about Nostradamus's prophecies.
- Re: Probability problem
- Re: Converse to Riemann-Lebesgue lemma
- Re: Is this a Godellian Paradox?
- Re: Is this a Godellian Paradox?
- Re: Random choice of numbers
- Re: MathForum
- to show that C[a,b] is subspace of Lp[a,b] (p finite)
- Re: MathForum
- Re: Random choice of numbers
- Re: Random choice of numbers
- Re: Random choice of numbers
- Re: MathForum
- Re: MathForum
- Re: A variant on the "Secret Santa"
- From: cbrown@xxxxxxxxxxxxxxxxx
- Re: -- Packing unit circles in circles: new results
- Re: yet another f(f(x)) = x equation
- Re: MathForum
- Re: Random choice of numbers
- Re: Converse to Riemann-Lebesgue lemma
- x_n converging to x "in normed space (V, || ||)"
- Re: Is there a Discrete Exponential Distribution?
- Addition of rotations
- Re: JSH: Weird blind spots with Pell's Equation
- Re: Parametric Pell's Equation and circle
- Re: f continuous, 2pi periodic; s_n(f) does not converge to f uniformly (as n-> infinity)
- Random choice of numbers
- Re: Parametric Pell's Equation and circle
- Re: f continuous, 2pi periodic; s_n(f) does not converge to f uniformly (as n-> infinity)
- A variant on the "Secret Santa"
- Re: fourier series of f ' relative to f
- Re: fourier series of f ' relative to f
- Re: Probability problem
- f continuous, 2pi periodic; s_n(f) does not converge to f uniformly (as n-> infinity)
- Re: Converse to Riemann-Lebesgue lemma
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- Re: f(n) = (L+1+2*sqrt(L+1/2))^[n] ,simplify
- Re: Converse to Riemann-Lebesgue lemma
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- Re: Blending three functions at the intersection of three regions?
- Converse to Riemann-Lebesgue lemma
- Re: f(n) = (L+1+2*sqrt(L+1/2))^[n] ,simplify
- From: alainverghote@xxxxxxxxx
- Re: Conformal mapping from one annuli to another
- Re: Parametric Pell's Equation and circle
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- Re: Blending three functions at the intersection of three regions?
- Re: Probability problem
- Re: Continuity, integration, and uniform convergence.
- Re: How can I show that L_infinity[a,b] is not separable?
- Probability problem
- Re: Uniform convergence
- Re: fourier series of f ' relative to f
- Re: fourier series of f ' relative to f
- Re: Conformal mapping from one annuli to another
- Re: MathForum
- Re: f(n) = (L+1+2*sqrt(L+1/2))^[n] ,simplify
- Re: f(n) = (L+1+2*sqrt(L+1/2))^[n] ,simplify
- From: alainverghote@xxxxxxxxx
- Re: yet another f(f(x)) = x equation
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- Continuity, integration, and uniform convergence.
- Re: Closed subset of a product
- Re: String Manipulation Puzzle
- Re: String Manipulation Puzzle
- Re: yet another f(f(x)) = x equation
- Re: MathForum
- Re: MathForum
- Re: Blending three functions at the intersection of three regions?
- Re: Parametric Pell's Equation and circle
- Re: MathForum
- Re: -- Induced homomorphisms (of groups)
- Re: How can I show that L_infinity[a,b] is not separable?
- Re: Uniform convergence
- Re: JSH: Understanding the 'why' of Pell's Equation
- Re: Blending three functions at the intersection of three regions?
- Re: MathForum
- How can I show that L_infinity[a,b] is not separable?
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- Re: Polynomial approximation of Randomness ?
- Re: Blending three functions at the intersection of three regions?
- -- Induced homomorphisms (of groups)
- Re: more math by tommy1729
- Re: Blending three functions at the intersection of three regions?
- Re: Parametric Pell's Equation and circle
- Re: Blending three functions at the intersection of three regions?
- Re: what is Math ?
- Re: Conformal mapping from one annuli to another
- Re: Et Tu, Bott? : Unimodularity of Intersection Form in 4-D
- Re: f(n) = (L+1+2*sqrt(L+1/2))^[n] ,simplify
- Re: adding a boundary to a Riemann domain
- Re: sequence question
- more math by tommy1729
- Re: UFO sighting on google maps
- Blending three functions at the intersection of three regions?
- Re: Distinguish nested brackets in Mathematica
- Re: Orders and Quotients
- Re: Closed subset of a product
- Re: Uniform convergence
- Re: Bounded Variation
- Re: Bounded Variation
- What are the chances to win in a lottery game?
- Re: Regular polygon
- Re: Parametric Pell's Equation and circle
- Re: Polynomial approximation of Randomness ?
- Re: yet another f(f(x)) = x equation
- Re: .9 repeating
- Re: f(n) = (L+1+2*sqrt(L+1/2))^[n] ,simplify
- Re: f(n) = (L+1+2*sqrt(L+1/2))^[n] ,simplify
- Re: f(n) = (L+1+2*sqrt(L+1/2))^[n] ,simplify
- Re: is the union of all open intervals (a,oo) = R?
- Re: Uniform convergence
- Re: MathForum
- Re: Alternate proof of conditional probability
- Re: MathForum
- Re: MathForum
- Re: MathForum
- Re: Inverse Fourier transform
- Re: Regular polygon
- Re: Parametric Pell's Equation and circle
- Bounded Variation
- Re: JSH: Could they be aliens?
- Re: JSH: Could they be aliens?
- Re: JSH: Could they be aliens?
- Polynomial approximation of Randomness ?
- Regular polygon
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- Closed subset of a product
- Re: range of a normal operator
- Re: fourier series of f ' relative to f
- Re: Parametric Pell's Equation and circle
- Re: Rigid transformation in two ways
- Re: JSH: Understanding the 'why' of Pell's Equation
- Re: MathForum
- Hadamard inequality type
- Re: Rigid transformation in two ways
- Re: .9 repeating
- Re: .9 repeating
- Re: Rigid transformation in two ways
- Rigid transformation in two ways
- Re: fourier series of f ' relative to f
- Re: fourier series of f ' relative to f
- Re: fourier series of f ' relative to f
- Re: MathForum
- Re: range of a normal operator
- String Manipulation Puzzle
- Re: MathForum
- Re: .9 repeating
- f(n) = (L+1+2*sqrt(L+1/2))^[n] ,simplify
- From: alainverghote@xxxxxxxxx
- Re: prime square and cube
- Re: MathForum
- Re: range of a normal operator
- Re: Uniform convergence
- Re: fourier series of f ' relative to f
- Re: Conformal mapping from one annuli to another
- Re: range of a normal operator
- Re: prime square and cube
- range of a normal operator
- Re: Uniform convergence
- Uniform convergence
- Re: Parametric Pell's Equation and circle
- Re: .9 repeating
- Re: When is a matrix a sum of rank one projections ?
- Et Tu, Bott? : Unimodularity of Intersection Form in 4-D
- Re: prime square and cube
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- Re: MathForum
- Re: MathForum
- Re: When is a matrix a sum of rank one projections ?
- Re: Distinguish nested brackets in Mathematica
- Re: fourier series of f ' relative to f
- Re: Is there a Discrete Exponential Distribution?
- Re: Conformal mapping from one annuli to another
- Re: Books, links on Haar System
- Re: Conformal mapping from one annuli to another
- Re: MathForum
- Re: A new definition for "Life"
- Re: Is this a Godellian Paradox?
- Re: MathForum
- Re: MathForum
- Re: projection operator is not commutative?
- Re: Is this a Godellian Paradox?
- Re: MathForum
- Re: prime square and cube
- Re: Distinguish nested brackets in Mathematica
- Re: Is this a Godellian Paradox?
- Re: prime square and cube
- Re: sequence question
- Re: Is there a Discrete Exponential Distribution?
- Re: Distinguish nested brackets in Mathematica
- Re: Algebraic Topology Question
- Re: projection operator is not commutative?
- Re: Approximation for Bessel function of 2nd kind?
- Re: prime square and cube
- Approximation for Bessel function of 2nd kind?
- Is this a Godellian Paradox?
- Re: JSH: Understanding the situation
- Re: Algebraic Topology Question
- Re: Distinguish nested brackets in Mathematica
- Re: probability question
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- Re: JSH-inspired poem
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- Re: When is a matrix a sum of rank one projections ?
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- Re: Definition of Normal Extension
- adding a boundary to a Riemann domain
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- Re: Algebraic Topology Question
- Re: Is there a Discrete Exponential Distribution?
- Re: Is there a Discrete Exponential Distribution?
- Re: MathForum
- Re: Conformal mapping from one annuli to another
- Re: SVD pseudoinverse
- Is there a Discrete Exponential Distribution?
- Re: Comprehensive Solution Manual for Textbooks
- Re: JSH: Continuing mystery?
- Re: JSH: Continuing mystery?
- Re: SVD pseudoinverse
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- Re: help proving a basic congruence property
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- Re: Fourier multiplier on the torus
- help proving a basic congruence property
- Re: fourier series of f ' relative to f
- Re: JSH: Continuing mystery?
- Re: Conformal mapping from one annuli to another
- Re: MathForum
- When is a matrix a sum of rank one projections ?
- Functions and mapping
- Re: Does commutativity imply associativity?
- Re: MathForum
- Re: Distinguish nested brackets in Mathematica
- Re: Interesting system of ODE, application in physics?
- Re: Can a certain determination be made on a large composite such as rsa2048?
- Re: MathForum
- Re: prime square and cube
- Re: Books, links on Haar System
- Distinguish nested brackets in Mathematica
- Re: prime square and cube
- Re: e^z = z
- Algebraic Topology Question
- Re: prime square and cube
- Re: prime square and cube
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- Re: sequence question
- Re: Can a certain determination be made on a large composite such as rsa2048?
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- SVD pseudoinverse
- Re: $50US prize for progression on equivalence between polysign P4 and RxC
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- Re: sequence question
- Re: sequence question
- Re: probability question
- Re: sequence question
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- Re: sequence question
- Orders and Quotients
- sequence question
- Cosine Envelope Function
- Re: e^z = z
- Re: e^z = z
- Re: MathForum
- Re: Expression for partial sum of e
- Re: MathForum
- Re: prime square and cube
- Re: prime square and cube
- Re: prime square and cube
- Re: prime square and cube
- Re: prime square and cube
- Re: prime square and cube
- Re: JSH: Purpose of these posts on this newsgroup
- Re: JSH: Purpose of these posts on this newsgroup
- Re: About two no simultaneously integer expressions...
- Re: MathForum
- Re: JSH: Continuing mystery?
- Re: JSH: Continuing mystery?
- Re: JSH: Continuing mystery?
- Re: Does commutativity imply associativity?
- Books, links on Haar System
- Re: Can a certain determination be made on a large composite such as rsa2048?
- Re: e^z = z
- Re: e^z = z
- Re: e^z = z
- Re: JSH: Continuing mystery?
- Re: e^z = z
- Re: Can a certain determination be made on a large composite such as rsa2048?
- Re: Definition of Normal Extension
- Re: JSH: Continuing mystery?
- Re: What condition of an operator ensures that operator can be used in any order?
- Re: What condition of an operator ensures that operator can be used in any order?
- Re: MathForum
- Re: Does commutativity imply associativity?
- Re: Does commutativity imply associativity?
- Re: prime square and cube
- What condition of an operator ensures that operator can be used in any order?
- Does commutativity imply associativity?
- Re: MathForum
- Re: e^z = z
- Re: Conformal mapping from one annuli to another
- Re: projection operator is not commutative?
- Re: probability question
- Re: Is 361 a real miracle or a hoax?
- Re: e^z = z
- Re: e^z = z
- Re: prime square and cube
- Re: probability question
- Re: Alternate proof of conditional probability
- Re: $50US prize for progression on equivalence between polysign P4 and RxC
- Fourier multiplier on the torus
- Re: projection operator is not commutative?
- Re: e^z = z
- Re: MathForum
- Re: Alternate proof of conditional probability
- Re: probability question
- Re: MathForum
- Re: Inverse Fourier transform
- Re: MathForum
- Re: is the union of all open intervals (a,oo) = R?
- Re: Is 361 a real miracle or a hoax?
- Re: Can a certain determination be made on a large composite such as rsa2048?
- is the union of all open intervals (a,oo) = R?
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- Re: PELLS EQUATION revisted infinite solution
- Definition of Normal Extension
- Re: probability question
- Re: fourier series of f ' relative to f
- Inverse Fourier transform
- Alternate proof of conditional probability
- Re: PELLS EQUATION revisted infinite solution
- Re: PELLS EQUATION revisted infinite solution
- Re: Can a certain determination be made on a large composite such as rsa2048?
- Re: probability question
- Re: Is 361 a real miracle or a hoax?
- Re: probability question
- Re: Orders and Quotients
- Re: probability question
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- Re: Two Questions About Godel's Original Paper
- Re: MathForum
- probability question
- Re: Two Questions About Godel's Original Paper
- Re: open and closed sets
- Re: Is 361 a real miracle or a hoax?
- Re: Two Questions About Godel's Original Paper
- Re: MathForum
- Re: Two Questions About Godel's Original Paper
- Re: MathForum
- Re: open and closed sets
- Re: MathForum
- Re: MathForum
- Re: Is 361 a real miracle or a hoax?
- From: Jens Stueckelberger
- Re: MathForum
- Re: Analysis
- Re: open and closed sets
- Re: -- equivalence with respect to inverse images
- Re: prime square and cube
- Re: Analysis
- Re: SOLVING SIGNALS & SYSTEM PROBLEM
- Re: -- equivalence with respect to inverse images
- Re: Is 361 a real miracle or a hoax?
- Re: MathForum
- Re: Define mass ... References
- Re: e^z = z
- SOLVING SIGNALS & SYSTEM PROBLEM
- e^z = z
- Re: open and closed sets
- Re: PELLS EQUATION revisted infinite solution
- Re: prime square and cube
- Re: MathForum
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- Re: Define mass
- Re: open and closed sets
- Re: MathForum
- Re: About two no simultaneously integer expressions...
- Re: MathForum
- open and closed sets
- Re: MathForum
- Re: Making a matrix non-singular
- Re: MathForum
- Re: fourier series of f ' relative to f
- Re: Conformal mapping from one annuli to another
- Re: exponential sum
- Re: About two no simultaneously integer expressions...
- Re: exponential sum
- Re: no algebra on a bi-torus ?
- Re: exponential sum
- From: victor_meldrew_666@xxxxxxxxxxx
- Re: no algebra on a bi-torus ?
- Re: slant asymptotes involving radicals
- Re: yet another f(f(x)) = x equation
- From: alainverghote@xxxxxxxxx
- Re: slant asymptotes involving radicals
- Re: fourier series of f ' relative to f
- Re: About two no simultaneously integer expressions...
- MathForum
- Re: plouffe inverter tables, 2.68 billion constants online
- Re: fourier series of f ' relative to f
- Re: Need detailed proof for construction of square root of 2
- Re: JSH: Why you're fun
- Re: JSH:Why you're more interesting
- Re: PELLS EQUATION revisted infinite solution
- Re: Analysis
- slant asymptotes involving radicals
- Re: Need detailed proof for construction of square root of 2
- Re: About two no simultaneously integer expressions...
- Re: exponential sum
- Re: -- equivalence with respect to inverse images
- Re: Algebraic re-writing
- Re: Limits
- Analysis
- Re: projection operator is not commutative?
- Re: Function
- Limits
- Re: -- equivalence with respect to inverse images
- Re: projection operator is not commutative?
- PELLS EQUATION revisted infinite solution
- exponential sum
- Re: -- equivalence with respect to inverse images
- About two no simultaneously integer expressions...
- Re: .9 repeating
- Need detailed proof for construction of square root of 2
- Re: Cantor's argument is erroneous
- Re: JSH: Why you're more interesting
- Re: .9 repeating
- Re: projection operator is not commutative?
- Re: The complete infinite binary tree has only countably many infinite paths.
- Re: no algebra on a bi-torus ?
- Re: -- equivalence with respect to inverse images
- projection operator is not commutative?
- Re: -- equivalence with respect to inverse images
- Making a matrix non-singular
- Re: Function
- Re: no algebra on a bi-torus ?
- Re: plouffe inverter tables, 2.68 billion constants online
- Re: -- equivalence with respect to inverse images
- Re: no algebra on a bi-torus ?
- Re: prime square and cube
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- Re: JSH: Understanding the situation
- Re: Function
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- Re: JSH: Understanding the situation
- Re: Function
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- Re: Two Questions About Godel's Original Paper
- no algebra on a bi-torus ?
- Re: Two Questions About Godel's Original Paper
- Re: Two Questions About Godel's Original Paper
- Re: prime square and cube
- Re: Two Questions About Godel's Original Paper
- Re: Algebraic re-writing
- Re: JSH: Could they be aliens?
- Re: Conformal mapping from one annuli to another
- Re: prime square and cube
- Re: yet another f(f(x)) = x equation
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- Re: JSH: Could they be aliens?
- Galois resolvents
- Re: yet another f(f(x)) = x equation
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- Re: yet another f(f(x)) = x equation
- Re: Algebraic re-writing
- From: Wlodzimierz Holsztynski (Wlod)
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- Re: Combinatorics of intervals of integers
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- Re: Vasia Akson & Grigorij Perelman
- From: Wlodzimierz Holsztynski (Wlod)
- Algebraic re-writing
- Re: Combinatorics of intervals of integers
- Re: JSH: Could they be aliens?
- Re: JSH: "Fodder for the Beast"
- Re: Is 361 a real miracle or a hoax?
- Re: Combinatorics of intervals of integers
- Re: prime square and cube
- yet another f(f(x)) = x equation
- Re: prime square and cube
- Re: Why you're more interesting
- Re: prime square and cube
- Re: Is 361 a real miracle or a hoax?
- Re: fourier series of f ' relative to f
- Re: prime square and cube
- Re: prime square and cube
- fourier series of f ' relative to f
- Re: -- equivalence with respect to inverse images
- Re: prime square and cube
- Re: Vasia Akson & Grigorij Perelman
- Re: Vasia Akson & Grigorij Perelman
- Re: ellipse circumference
- Re: JSH: Why you're more interesting
- Re: -- equivalence with respect to inverse images
- Re: JSH: Why you're more interesting
- From: Jens Stueckelberger
- Re: prime square and cube
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- Re: "Surreal Numbers" Filled With Gaps?
- Re: Conformal mapping from one annuli to another
- Re: JSH: Could they be aliens?
- Re: JSH: Could they be aliens?
- Re: JSH: Could they be aliens?
- Re: JSH: Could they be aliens?
- Re: JSH: Could they be aliens?
- Re: .9 repeating
- Re: JSH: Could they be aliens?
- Re: Vasia Akson & Grigorij Perelman
- Re: JSH: Why they lurk
- Re: Special Functions
- Re: subset sum is prime
- Re: JSH: Why they lurk
- Re: JSH: Could they be aliens?
- Re: C program to look for large values of | zeta( 1/2 + it) | w.r.t. t
- Re: Godel Incompleteness Theorem
- Combinatorics of intervals of integers
- Vasia Akson & Grigorij Perelman
- From: Wlodzimierz Holsztynski (wlod)
- Re: Godel Incompleteness Theorem
- Re: multi-dimensional gaussian sampling
- Re: prime square and cube
- Re: Mod
- Re: Silly statistics question
- Re: JSH: Why you're more interesting
- Re: Why you're more interesting
- Re: JSH: Could they be aliens?
- Re: prime square and cube
- Re: Is 361 a real miracle or a hoax?
- Re: JSH: Could they be aliens?
- subset sum is prime
- Re: Is 361 a real miracle or a hoax?
- Re: -- equivalence with respect to inverse images
- Re: JSH: Could they be aliens?
- Re: JSH: Why they lurk
- Re: prime square and cube
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- Re: prime square and cube
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- Re: Godel Incompleteness Theorem
- Re: JSH: Why you're more interesting
- Re: JSH: "Fodder for the Beast"
- Re: JSH: Could they be aliens?
- JSH: Why you're more interesting
- (Humor) You Might be a Mathematician if ... (Humor)
- Re: Godel Incompleteness Theorem
- Re: JSH: Why they lurk
- What makes it so difficult to understand?
- Re: JSH: Why they lurk
- Re: prime square and cube
- Re: Godel Incompleteness Theorem
- prime square and cube
- Re: JSH: Why they lurk
- Re: Godel Incompleteness Theorem
- Re: Godel Incompleteness Theorem
- Re: JSH "Fodder for the Beast"
- Re: JSH: Why they lurk
- Re: Godel Incompleteness Theorem
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- Re: JSH: Could they be aliens?
- Re: Godel Incompleteness Theorem
- Re: JSH: Why they lurk
- Re: JSH: Could they be aliens?
- Re: Is 361 a real miracle or a hoax?
- From: Jens Stueckelberger
- Conformal mapping from one annuli to another
- Re: JSH-inspired poem
- Re: JSH: Could they be aliens?
- Re: Is 361 a real miracle or a hoax?
- Re: Is 361 a real miracle or a hoax?
- Re: Silly statistics question
- Re: .9 repeating
- Re: What prevents protons and electrons from coming together?
- Re: Is 361 a real miracle or a hoax?
- Re: JSH: Could they be aliens?
- Re: Define mass
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- Re: JSH: Why they lurk
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- Re: Define mass... my assmass ?
- Re: JSH: Could they be aliens?
- Re: JSH: Could they be aliens?
