Примери за използване на Algebraic equation на Английски и техните преводи на Български
{-}
-
Colloquial
-
Official
-
Medicine
-
Ecclesiastic
-
Ecclesiastic
-
Computer
Approximate roots of algebraic equations.
Algebraic equations satisfied by roots of natural numbers.
So let me write this as maybe an algebraic equation that you're familiar with.
In 1834 Lobachevskii found a method for the approximation of the roots of algebraic equations.
Expanding an algebraic equation means getting rid of the parentheses.
Our online service allows us to solve systems of linear algebraic equations in various ways.
The solutions to this algebraic equation are going to be numbers, or a set of numbers.
The consequence of this difference is that at every step, a system of algebraic equations has to be solved.
There is no finite algebraic equation built from whole numbers that will give an exact value for pi.
Reduction of the variance in Monte Carlo algorithms for solving systems of linear algebraic equations.
Transcendental numbers cannot be roots of algebraic equations with rational coefficients.
An algebraic equation might look something like, and I will just write up a simple quadratic.
Naimark's first work for his candidate's thesis was on the separation of roots of algebraic equations.
On the other hand,factoring out an algebraic equation means adding parentheses to the equation. .
The description of such systems is usually given by systems of linear and non-linear algebraic equations.
Thus an algorithm can be an algebraic equation such as y= m+ n- two arbitrary"input variables" m and n that produce an output y.
Most people would simply say that both terms have something to do with removing oradding parentheses in an algebraic equation.
The utility recognizes polynomials, algebraic equations, allows you to see the result directly during data entry(automatic construction).
He replaced the differential operator d/dx by a variable p transforming a differential equation into an algebraic equation.
Thus we might expect an algorithm to be an algebraic equation such as y= m+ n- two arbitrary“input variables” m and n that produce an output y.
He replaced the differential operator d/dx by a variable p transforming a differential equation into an algebraic equation(Laplace Transforms).
The solution of the algebraic equation could be transformed back using conversion tables to give the solution of the original differential equation. .
Ferdinand von Lindemann was the first to prove that π is transcendental, that is,π is not the root of any algebraic equation with rational coefficients.
During this time he studied mathematical problems such as algebraic equations, the solution of partial differential equations and negative numbers.
Gelfond developed basic techniques in the study of transcendental numbers,that is numbers that are not the solution of an algebraic equation with rational coefficients.
Although an algebraic equation of the fifth degree cannot be solved in radicals, a result which was proved by Ruffini and Abel, Hermite showed in 1858 that an algebraic equation of the fifth degree could be solved using elliptic functions.
Ferdinand von Lindemann was the first to prove that π is transcendental, that is,π is not the root of any algebraic equation with rational coefficients.
In his work in group theory,Frobenius combined results from the theory of algebraic equations, geometry, and number theory, which led him to the study of abstract groups.
In"Eléments" Legendre gave a simple proof that π is irrational, as well as the first proof that π2 is irrational, andconjectured that π is not the root of any algebraic equation of finite degree with rational coefficients.
In 1888 Maschke proved that a particular sixth-degree equation could be solved by using hyperelliptic functions andBrioschi showed that any sixth-degree algebraic equation could be reduced to Maschke's equation and therefore solved in the same way.