Unit 9: Solution of Differential Equation




          7.   The solution obtained from the general solution by giving particular values to the arbitrary  Notes
               constants, is called a .......................... of the differential equation.

          9.3 Solution and Constant of Integration


          A solution or integral of a differential equation is a relation between the variables, by means of
          which and the derivatives obtained therefore, the equation is satisfied.
          Finding the unknown function is called solving or integrating the differential equation. The
          solution or integral of a differential equation is also called its primitive, because the differential
          equation can be regarded as a relation derived from it.
          The solution of a differential equation which contains a number of arbitrary constants equal to
          the order of the differential equation is called the general solution (or  complete integral or
          complete  primitive). A  solution obtainable from the  general solution  by giving  particular
          values to the constants is called a particular solution.

          E.g. If y = A cos x + B sin x                                      …………(1)

                dy
          Then       A sin x – B cos x
                dx

               2
              d y
          and   2     A cos x – B sin x
              dx
              2
             d y
          or   2    y
             dx
              2
             d y
              2  + y = 0                                                    …………(2)
             dx
          Thus (1) is a solution of (2)
          Note: Here y = A cos x + B sin x (involving two arbitrary constants A  and B) is the general
                     2
                    d y
          solution of   2  + y = 0 of second order equation.
                    dx

               !
             Caution  The solution of differential equation of nth order is its particular  solution if it
             contains less than n arbitrary constants.

          Self Assessment


          Fill in the blanks:
          8.   A solution or integral of a differential equation is a .......................... between the variables,
               by means of which and the derivatives obtained therefore, the equation is satisfied.

          9.   Finding the ..........................  function is called solving or integrating the differential equation.
          10.  The solution or integral of a differential equation is also called .........................., because the
               differential equation can be regarded as a relation derived from it.






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