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Page 1
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 1
Paper: Ordinary Differential Equations
Lesson: Existence and Uniqueness of Solutions of first
order differential equations
Lesson Developer: Dr. Sada Nand Prasad
College/Department: Department of Mathematics, A.N.D.
College, University of Delhi
Page 2
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 1
Paper: Ordinary Differential Equations
Lesson: Existence and Uniqueness of Solutions of first
order differential equations
Lesson Developer: Dr. Sada Nand Prasad
College/Department: Department of Mathematics, A.N.D.
College, University of Delhi
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 2
Table of Contents:
Chapter: Existence and Uniqueness of Solutions of first order differential equations
? 1. Learning Outcomes
? 2. Introduction
? 3. Equations which can be Factorized or solvable for p
? 4. Equations which cannot be Factorized
4.1. Equations Solvable for x
4.2. Equations Solvable for y
? 5. Clairaut's Equation
? 6. Singular Solution
? 7. Envelops and Orthogonal trajectories
? 8. Existence and Uniqueness of Solutions of first order
differential equations
? Summary
? Exercises
? References/ Further Reading
Page 3
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 1
Paper: Ordinary Differential Equations
Lesson: Existence and Uniqueness of Solutions of first
order differential equations
Lesson Developer: Dr. Sada Nand Prasad
College/Department: Department of Mathematics, A.N.D.
College, University of Delhi
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 2
Table of Contents:
Chapter: Existence and Uniqueness of Solutions of first order differential equations
? 1. Learning Outcomes
? 2. Introduction
? 3. Equations which can be Factorized or solvable for p
? 4. Equations which cannot be Factorized
4.1. Equations Solvable for x
4.2. Equations Solvable for y
? 5. Clairaut's Equation
? 6. Singular Solution
? 7. Envelops and Orthogonal trajectories
? 8. Existence and Uniqueness of Solutions of first order
differential equations
? Summary
? Exercises
? References/ Further Reading
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 3
1. Learning Outcomes:
After completing this chapter, we can
? resolve the differential equations into rational and solve it.
? solve equations for p, x and y.
? explain Clairaut's equation and find its solution
? find the singular solution of a differential equation
? Find the envelopes and orthogonal trajectories of the family of different surfaces
? state the existence and uniqueness theorem for first order ordinary differential
equations and use it to know whether the solution exist and unique or not.
Page 4
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 1
Paper: Ordinary Differential Equations
Lesson: Existence and Uniqueness of Solutions of first
order differential equations
Lesson Developer: Dr. Sada Nand Prasad
College/Department: Department of Mathematics, A.N.D.
College, University of Delhi
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 2
Table of Contents:
Chapter: Existence and Uniqueness of Solutions of first order differential equations
? 1. Learning Outcomes
? 2. Introduction
? 3. Equations which can be Factorized or solvable for p
? 4. Equations which cannot be Factorized
4.1. Equations Solvable for x
4.2. Equations Solvable for y
? 5. Clairaut's Equation
? 6. Singular Solution
? 7. Envelops and Orthogonal trajectories
? 8. Existence and Uniqueness of Solutions of first order
differential equations
? Summary
? Exercises
? References/ Further Reading
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 3
1. Learning Outcomes:
After completing this chapter, we can
? resolve the differential equations into rational and solve it.
? solve equations for p, x and y.
? explain Clairaut's equation and find its solution
? find the singular solution of a differential equation
? Find the envelopes and orthogonal trajectories of the family of different surfaces
? state the existence and uniqueness theorem for first order ordinary differential
equations and use it to know whether the solution exist and unique or not.
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 4
2. Introduction:
We have used many methods to solve differential equations of first order and of degree
1, e.g., differential equations that can be separated in different variables, exact
differential equations, equations that can be reduced to homogeneous equation and
those equations that become exact when we multiply them by some integrating factor.
In this chapter, we will keep our discussion on the differential equations which are of
first order but of higher degree.
Let us take
dy
p
dx
? , then the general form of the first order and nth degree differential
equation is given by the equation
12
12
... 0 (1)
n n n
n
p A p A p A
??
? ? ? ? ?
where
1
A ,
2
A ,...,
n
A are functions of x and y.
It is not simple to find the solution of eqn. (1) in its general form. In this chapter we
consider only that type of eqn. (1) which we can solve easily and explain the methods
for solving those equations.
Also we shall discuss the Clairaut equation, the singular solution of the differential
equations, the envelopes and orthogonal trajectories of the family of surfaces and state
and the existence and uniqueness theorem for first order ordinary differential equations
in this chapter.
Page 5
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 1
Paper: Ordinary Differential Equations
Lesson: Existence and Uniqueness of Solutions of first
order differential equations
Lesson Developer: Dr. Sada Nand Prasad
College/Department: Department of Mathematics, A.N.D.
College, University of Delhi
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 2
Table of Contents:
Chapter: Existence and Uniqueness of Solutions of first order differential equations
? 1. Learning Outcomes
? 2. Introduction
? 3. Equations which can be Factorized or solvable for p
? 4. Equations which cannot be Factorized
4.1. Equations Solvable for x
4.2. Equations Solvable for y
? 5. Clairaut's Equation
? 6. Singular Solution
? 7. Envelops and Orthogonal trajectories
? 8. Existence and Uniqueness of Solutions of first order
differential equations
? Summary
? Exercises
? References/ Further Reading
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 3
1. Learning Outcomes:
After completing this chapter, we can
? resolve the differential equations into rational and solve it.
? solve equations for p, x and y.
? explain Clairaut's equation and find its solution
? find the singular solution of a differential equation
? Find the envelopes and orthogonal trajectories of the family of different surfaces
? state the existence and uniqueness theorem for first order ordinary differential
equations and use it to know whether the solution exist and unique or not.
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 4
2. Introduction:
We have used many methods to solve differential equations of first order and of degree
1, e.g., differential equations that can be separated in different variables, exact
differential equations, equations that can be reduced to homogeneous equation and
those equations that become exact when we multiply them by some integrating factor.
In this chapter, we will keep our discussion on the differential equations which are of
first order but of higher degree.
Let us take
dy
p
dx
? , then the general form of the first order and nth degree differential
equation is given by the equation
12
12
... 0 (1)
n n n
n
p A p A p A
??
? ? ? ? ?
where
1
A ,
2
A ,...,
n
A are functions of x and y.
It is not simple to find the solution of eqn. (1) in its general form. In this chapter we
consider only that type of eqn. (1) which we can solve easily and explain the methods
for solving those equations.
Also we shall discuss the Clairaut equation, the singular solution of the differential
equations, the envelopes and orthogonal trajectories of the family of surfaces and state
and the existence and uniqueness theorem for first order ordinary differential equations
in this chapter.
Existence and Uniqueness of Solutions of first order differential equations
Institute of Lifelong Learning, University of Delhi Pg. 5
3. Equations which can be factorized:
The general form of the first order and nth degree differential equation is given by,
12
12
... 0
n n n
n
p A p A p A
??
? ? ? ? ? ?
where
1
A ,
2
A ,...,
n
A are functions of the variables x and y.
Now there are two possibilities:
(a) If we resolve
12
12
...
n n n
n
p A p A p A
??
? ? ? ? into rational factors of degree 1, then it
can be written as
? ? ? ? ? ?
12
... 0 (2)
n
p f p f p f ? ? ? ?
where
1
f ,
2
f ,...,
n
f are functions of the variables x and y.
Since all those values of y, for which the factors in eqn. (2) become zero, will satisfy
eqn. (1). Hence, to solve eqn. (1), we will have to equate each of the factors given in
eqn. (2) to zero. i.e.,
0, 1,2,..., (3)
r
p f r n ? ? ?
If
? ? , , 0, 1,2,..., (4)
rr
F x y C r n ??
where , 1,2,..., constants.
r
C r n arearbitrary ?
are the solutions for eqns. (3), then the general solution of eqn. (1) is given by
? ? ? ? ? ?
1 1 2 2
, , . , , ... , , 0, (5)
nn
F x y C F x y C F x y C ?
All the constants in eqn. (5), namely,
12
, ,...,
n
C C C can have infinite number of values,
so all these solutions given by eqn. (5), will remain general even if we take
12
...
n
C C C C ? ? ? ? . Hence, the general solution is given by
? ? ? ? ? ?
12
, , . , , ... , , 0, (6)
n
F x y C F x y C F x y C ?
(b) When the left-hand side of eqn. (1) cannot be factorized. We will take this possibility
in the next section.
Value Additions:
Since we are dealing with the first order differential equation, the general solution should
contain only one arbitrary constant. There is no loss of generality by replacing the n
arbitrary constants by a single arbitrary constant.
Example 1: Solve the differential equation
2 2 2
6 0,
dy
x p xy p y wherep
dx
? ? ? ? .
Solutions: We have
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FAQs on Lecture 1 - Existence and Uniqueness of Solutions of first order differential equations - Ordinary Differential Equations- Order, Degree, Formation - Engineering Mathematics
| 1. What is the significance of existence and uniqueness of solutions in first order differential equations? |  |
Ans. The existence and uniqueness of solutions in first order differential equations are important because they guarantee that there is a solution to the equation and that this solution is unique. This means that for a given initial condition, there is only one possible solution. It provides a solid mathematical foundation for solving real-world problems and ensures that the solutions obtained are reliable and accurate.
| 2. How can we determine the existence and uniqueness of solutions in first order differential equations? | |
Ans. The existence and uniqueness of solutions in first order differential equations can be determined by checking if the equation satisfies certain conditions. These conditions include the continuity and differentiability of the function on a given interval, as well as the Lipschitz condition, which ensures that the derivative of the function does not grow too rapidly. If these conditions are met, then the existence and uniqueness of solutions can be guaranteed.
| 3. What happens if the conditions for existence and uniqueness of solutions are not satisfied in a first order differential equation? | |
Ans. If the conditions for existence and uniqueness of solutions are not satisfied in a first order differential equation, then it is possible that there may not be a solution or that there may be multiple solutions. This can lead to inconsistencies and difficulties in solving the equation, as the solutions may not be reliable or accurate. It is important to carefully analyze the conditions before attempting to solve a first order differential equation to ensure the validity of the solutions obtained.
| 4. Can a first order differential equation have infinitely many solutions? | |
Ans. No, a first order differential equation cannot have infinitely many solutions. The existence and uniqueness of solutions theorem guarantees that for a given initial condition, there is only one possible solution. This means that the solution to a first order differential equation is unique and cannot have infinitely many solutions. However, it is possible for different initial conditions to lead to different solutions, but each solution is unique for its respective initial condition.
| 5. How are first order differential equations used in engineering applications? | |
Ans. First order differential equations are widely used in engineering applications to model real-world phenomena and solve problems. They are used to describe the rate of change of various physical quantities such as temperature, velocity, and concentration. By solving these equations, engineers can predict the behavior of systems and design solutions to optimize performance. For example, in electrical engineering, first order differential equations are used to analyze circuits and determine current and voltage behavior. In mechanical engineering, they are used to study motion and dynamics of objects. Overall, first order differential equations are a fundamental tool in engineering mathematics.
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