Solving Ordinary Differential Equations With Variable Coefficients Using Laplace Transform

مشروع البحث:
Solving Ordinary Differential Equations With Variable Coefficients Using Laplace Transform

رقم التعريف

24392

الباحث

منال عمر محمد قجام

الوصف

Introduction In mathematics, in general the differential equation is an equation in which the variable is a function, where the equation shows the relationship between the function and its derivatives. Solving the differential equations means finding all functions that satisfy this equation. The set of these functions is called the general solution to the equation (solution family), each element of this set is called a special solution to the equation. Differential equations play an important role in explaining physical and chemical scientific phenomena. The reason for this is that we can write the differential equations with many variables as a function of derivatives such as the speed and location of different bodies, so it is necessary to know the solution to these rates and how to deal with them. It should be noted that in many cases it is not possible to solve the equation completely algebraically, so it is important to get acquainted with the theories and properties of these equations, which by their nature facilitate framing the solution.

الكلمات الدالة

Solving Ordinary Differential Equations With Variable Coefficients Using Laplace Transform

صفحة العنصر كاملة

مشروع البحث:
Solving Ordinary Differential Equations With Variable Coefficients Using Laplace Transform

المساهمين

الممولين

رقم التعريف

الباحث

المشرفين

منشورات

وحدات تنظيمية

الوصف

الكلمات الدالة

مشروع البحث: Solving Ordinary Differential Equations With Variable Coefficients Using Laplace Transform

المساهمين

الممولين

رقم التعريف

الباحث

المشرفين

منشورات

وحدات تنظيمية

الوصف

الكلمات الدالة

مشروع البحث:
Solving Ordinary Differential Equations With Variable Coefficients Using Laplace Transform