Examples of using Euler's in English and their translations into Finnish
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Oh, an Euler's Disk.
Euler's method.- Euler's method.
I used Euler's number.
Euler's eyesight worsened throughout his mathematical career.
This is an Euler's Disk.
Euler's number"e," you know, the beautiful equation that connects three constants of mathematics?
No, no. Use Euler's.
Use Euler's. No, no.
Another contribution which we should mention is that as editor for two volumes of Euler's collected works.
This is an Euler's Disk.- What is happening?
Fuss helped Euler prepare over 250 articles for publication over a period on about seven years in which he acted as Euler's assistant, including an important work on insurance which was published in 1776.
Leonhard Euler's father was Paul Euler. .
He did not understand about shear stress in a fluid, butrather he based his work on modifying Euler 's equations to take into account forces between the molecules in the fluid.
Fuss, who was Euler's grandson-in-law, became his assistant in 1776.
This equation is known as Euler's polyhedron formula.
Euler's own account given in his unpublished autobiographical writings, see, is as follows.
When we combine this we see that Euler's theorem is actually generalisation of Fermat's theorem.
Euler's reputation was to bring an offer to go to Berlin, but at first he preferred to remain in St Petersburg.
This number lies in the n-th cyclotomic field- and in fact in its real subfield, which is a totally real field and a rational vector space of dimension½φ(n), where φ(n)is Euler's totient function.
Euler's work in mathematics is so vast that an article of this nature cannot but give a very superficial account of it.
Many great mathematicians of the past were preoccupied by numerical analysis, as is obvious from the names of important algorithms like Newton's method, Lagrange interpolation polynomial,Gaussian elimination, or Euler's method.
Johann Bernoulli soon discovered Euler's great potential for mathematics in private tuition that Euler himself engineered.
In addition, Euler's recognition that the key information was the number of bridges and the list of their endpoints(rather than their exact positions) presaged the development of topology.
In On the maximal number of pairwise orthogonal Latin squares of a given order(1960) Straus, together with Erdös and Chowla,solved Euler 's conjecture by showing that the number of pairwise orthogonal Latin squares of order n is greater than(1/3)n1/91.
He returned to St Petersburg in 1782 and, following Euler 's death in 1783, Lexell was appointed to succeed him to the chair of mathematics at the St Petersburg Academy of Sciences.
Karl Rubin found a more elementary proof of the Mazur-Wiles theorem by using Kolyvagin's Euler systems, described in Lang(1990) and Washington(1997), and later proved other generalizations of the main conjecture for imaginary quadratic fields.