Suchergebnisse
Suchergebnisse:
Vor einem Tag · Der (Gauß-d’Alembertsche) Fundamentalsatz der Algebra besagt, dass jedes nicht konstante Polynom im Bereich der komplexen Zahlen mindestens eine Nullstelle besitzt. Dabei können die Koeffizienten des Polynoms beliebige komplexe Zahlen sein – insbesondere sind Polynome mit ganzen oder reellen Koeffizienten mit eingeschlossen.
Vor einem Tag · Properties and theorems. The Laplace transform's key property is that it is converts differentiation and integration in the time domain into multiplication and division s in the Laplace domain. Thus, the Laplace variable s is also known as operator variable in the Laplace domain: either the derivative operator or (for s −1) the ...
Vor einem Tag · Every positive integer is congruent \pmod 3 (mod 3) to the sum of its digits. For example, 268 = 100 \cdot 2 + 10 \cdot 6 + 1 \cdot 8 268 = 100⋅2+10⋅6 +1⋅8 is congruent to 1 \cdot 2 + 1 \cdot 6 + 1 \cdot 8, 1⋅ 2+1⋅6+1⋅8, because 100,10, 100,10, and 1 1 are all congruent to 1 1 mod 3. 3.
Vor 5 Tagen · Bayes Theorem is a very important theorem in mathematics, that laid the foundation of a unique statistical inference approach called the Bayes’ inference. It is used to find the probability of an event, based on prior knowledge of conditions that might be related to that event.
Vor 5 Tagen · v. t. e. In mathematics, the Riemann hypothesis is the conjecture that the Riemann zeta function has its zeros only at the negative even integers and complex numbers with real part 1 2. Many consider it to be the most important unsolved problem in pure mathematics. [1] .
Vor 3 Tagen · The Chinese remainder theorem is a theorem which gives a unique solution to simultaneous linear congruences with coprime moduli. In its basic form, the Chinese remainder theorem will determine a number p p that, when divided by some given divisors, leaves given remainders. Contents. Theorem and Proof. Solving Systems of Congruences. Problem Solving
Vor 4 Tagen · Intuition behind the Theorems. To compute the volume of a solid formed by rotating a region R R around an external axis (a similar argument applies for surface area), one can break the region up into small regions of area \Delta A ΔA that are located a distance r r from the axis.