Browsing Matematik by Subject

Now showing items 1-14 of 14

      Subject
      Almost Hermitian manifold, anti-invariant submersion, invariant submersion, Kaehler manifold, semi-invariant submersion, slant submersion. [1]
      Altın oran, müzik, altın oran ve müzik. [1]
      Diofant Denklemleri, Baker’in Teorisi, Logaritmada Lineer Formlar, Fibonacci ve Lucas Sayıları, Sürekli Kesirler, Cebirsel Sayılar. [1]
      Diophantine equations, Baker’s theory, linear forms in logarithms, Fibonacci and Lucas numbers, continued fractions, algebraic numbers. [1]
      Finite and infinite continued fractions, approximations of finite and infinite continued fractions, periodic continued fractions, the Pell equation, and the solution of Pell equations, . [1]
      Finite and infinite continued fractions, approximations of finite and infinite continued fractions, periodic continued fractions, the Pell equation, and the solution of Pell equations, x^2-dy^2=±1. [1]
      Golden ratio, music, golden ratio and music. [1]
      Hemen hemen Hermityen manifold, anti-invaryant submersiyon, İnvaryant submersiyon, Kaehler manifold, Slant submersiyon, Yarı-invaryant submersiyon. [1]
      İkinci mertebeden diferansiyel denklem, Birinci mertebeden lineer diferansiyel denklem, İkinci mertebeden kısmi diferansiyel denklemler, Hyers-Ulam kararlılık, Hyers-Ulam-Rassias kararlılık, Mahgoub dönüşümü, Sabit nokta teorisi. [1]
      Riemann Dönüşümler, Noktasal Eğik Riemann Dönüşümler, Hemen Hemen Hermityen Manifold, Eğik Fonksiyon. [1]
      Riemannian Maps, Pointwise Slant Riemannian Maps, Almost Hermitian Manifolds,Slant Function. [1]
      Second order differential equation, first order linear differential equation, second order partial differential equations, Hyers-Ulam stability, Hyers-Ulam-Rassias stability, Mahgoub transform, fixed point theory. [1]
      Sonlu ve sonsuz Sürekli kesirler , Sonlu ve sonsuz Sürekli kesirlerin yaklaşımları, Periyodik sürekli kesirler, Pell denklemi, Pell Denklemlerinin Çözümü. [1]
      Sonlu ve sonsuz Sürekli kesirler, Sonlu ve sonsuz Sürekli kesirlerin yaklaşımları, Periyodik sürekli kesirler, Pell denklemi, x^2-dy^2=±1 Pell Denklemlerinin Çözümü. [1]