The differential equationis solving by the method of variation of parameters, where the complementary function is given by- y = c1y1(x) + c2y2(x)
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The differential equation is solving by the method of variation of parameters, the Wronskian will be______
Consider the following differential equation:
Which of the following is the solution of the above equation (c is an arbitrary constant)?
The differential equationis solving by the method of variation of parameters, then Wronskian will be –
Wronskian for solution y = c1y1(t) + c2y2(t) is defined as
Find the particular solution of the differential equation
Solution of differential equation (D2 + 4)y = cosec 2x
65 videos|120 docs|94 tests
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65 videos|120 docs|94 tests
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