Math
Unit-1Linear differential equations Question-1: Solve 
Sol.Its auxiliary equation is-
Where-
Therefore the complete solution is-
Question-2: Solve
Or,
Ans. Auxiliary equation is
Note: If roots are in complex form i.e. 
Question-3: Solve
Ans. Given, 
Auxiliary equation is 
Question-4: 
Given, 
For CF,Auxiliary equation is
For PI
Question-5: Solve 
Ans. The AE is 
Complete solution y= CF + PI
Question-6: Solve
Ans. The AE is 
Complete solutio0n is y= CF + PI
Question-7: solve
Ans. Given equation in symbolic form is
Its Auxiliary equation is 
Complete solution is y= CF + PI
Question-8: Find the PI of(D2-4D+3)y=ex cos2x Ans. 
Question-9: Solve 
Solution:Auxiliary equation 
Complementary function 
Complete Solution is 
Question-10: Solve 
Solution:The auxiliary equation is 
The C.F is
Question-11: Solve the following DE by using a variation of parameters-
Sol. We can write the given equation in symbolic form as-
To find CF-It’s A.E. is 
So that CF is- 
To find PI-Here 
Now 
Thus PI = 
So that the complete solution is-
Question-12: Solve 
Ans. Let, 
AE is 
y= CF + PI
Question-13: Solve 
Sol. As we see that this is Legendre’s linear equation.Now put 
So that- 
And 
Then the equation becomes- D (D – 1)y+ Dy + y = 2 sin t 
Its auxiliary equation is- 
And particular integral-
Note - 
Hence the solution is - 
Question-14: Solve the following simultaneous differential equations-
Given that x(0)=1 and y(0)= 0Solution:Consider the given equations,
Dy +2x = sin2t
Dx -2y = cos2tBy solving the above equations we get,(D2 +4)Y =0
X(0) = 1, y(0) = 0
A =0, B=-1
Sol.Its auxiliary equation is-Where-Therefore the complete solution is-Question-2: SolveOr,Ans. Auxiliary equation isNote: If roots are in complex form i.e. Question-3: SolveAns. Given, Auxiliary equation is Question-4: Given, For CF,Auxiliary equation isFor PIQuestion-5: Solve Ans. The AE is Complete solution y= CF + PI Question-6: Solve Ans. The AE is Complete solutio0n is y= CF + PIQuestion-7: solveAns. Given equation in symbolic form isIts Auxiliary equation is Complete solution is y= CF + PIQuestion-8: Find the PI of(D2-4D+3)y=ex cos2x Ans. Question-9: Solve Solution:Auxiliary equation Complementary function
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Complete Solution is Question-10: Solve Solution:The auxiliary equation is The C.F is
But
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Sol. We can write the given equation in symbolic form as-To find CF-It’s A.E. is So that CF is- To find PI-Here Now Thus PI = = = = = |
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Ans. Let, AE is y= CF + PI Question-13: Solve Sol. As we see that this is Legendre’s linear equation.Now put So that- And Then the equation becomes- D (D – 1)y+ Dy + y = 2 sin t Its auxiliary equation is- And particular integral- P.I. = |
Hence the solution is - Question-14: Solve the following simultaneous differential equations-Given that x(0)=1 and y(0)= 0Solution:Consider the given equations,Dy +2x = sin2t Dx -2y = cos2tBy solving the above equations we get,(D2 +4)Y =0X(0) = 1, y(0) = 0 A =0, B=-1
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