differential equation

Solution of Homogeneous Differential Equation

Here you will learn how to find solution of homogeneous differential equation of first order first degree with examples. Let’s begin – Solution of Homogeneous Differential Equation If a first degree first order differential equation is expressible in the form \(dy\over dx\) = \(f(x, y)\over g(x, y)\) where f(x, y) and g(x, y) are homogeneous

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Differential Equations Reducible to Variable Separable Form

Here you will learn how to find the solution of the differential equations reducible to variable separable form with examples. Let’s begin – Differential Equations Reducible to Variable Separable Form Differential Equations of the form \(dy\over dx\) = f(ax + by + c) can be reduce to variable separable form by the substitution ax +

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First Order First Degree Differential Equations

Here you will learn general form of first order first degree differential equations and methods of solving first order first degree. Let’s begin – General Form of First Order First Degree Differential Equations A differential equation of first order and first degree involves the independent variable x, dependent variable y, and \(dy\over dx\). So, it

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Solution of Differential Equation

Here you will learn how to find solution of differential equation i.e. general solution and particular solution with examples. Let’s begin – Solution of Differential Equation The solution of differential equation is a relation between the variables involved which satisfies the differential equation. for example, y = \(e^x\) is a solution of the differential equations

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Formation of Differential Equation

Here you will learn formation of differential equation with examples. Let’s begin – Formation of Differential Equation Algorithm 1). Write the equation involving independent variable x (say), dependent variable y (say) and the arbitrary constants. 2). Obtain the number of arbitrary constants in Step 1. Let there be n arbitrary constants. 3). Differentiate the relation

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Degree and Order of Differential Equation

Here you will learn what is differential equation and degree and order of differential equation with examples. Let’s begin – Differential Equation An equation containing an independent variable, dependent variable and differential coefficients of dependent variable with respect to independent variable is called a differential equation. for example : \(dy\over dx\) = 2xy and \(d^2y\over

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