Add to ORKGThis paper begins with an expression of the trapezoid rule for formal mechanical quadrature. Euler also sums the first ten terms of ζ(2) to get 1.549768 and gives an expression for the error term. Then he determines the sum of the first million terms of the harmonic series to be 14.392669
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
AbstractWallis's method of interpolation attracted the attention of the young Euler, who obtained so...
Throughout 2007, a great deal of attention was paid to the life and work of Leonhard Euler (1707–178...
This paper begins with an expression of the trapezoid rule for formal mechanical quadrature. Euler...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
This paper leads to Bernoulli numbers from an integral of an infinite series and is called a beautif...
This study presents three different proofs that the Euler series converges to n26. These are the fo...
This article features some genuine Eulerian magic. In 1748, Leonhard Euler considered a modification...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
AbstractWallis's method of interpolation attracted the attention of the young Euler, who obtained so...
Throughout 2007, a great deal of attention was paid to the life and work of Leonhard Euler (1707–178...
This paper begins with an expression of the trapezoid rule for formal mechanical quadrature. Euler...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
Euler continues with the methods of E25 to attack ζ(2) for a second time. He starts with a Taylor se...
This paper leads to Bernoulli numbers from an integral of an infinite series and is called a beautif...
This study presents three different proofs that the Euler series converges to n26. These are the fo...
This article features some genuine Eulerian magic. In 1748, Leonhard Euler considered a modification...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
AbstractWallis's method of interpolation attracted the attention of the young Euler, who obtained so...
Throughout 2007, a great deal of attention was paid to the life and work of Leonhard Euler (1707–178...