Explain the determine red 4.2.9Example IThe equationkk+4 -- Yk = 0(4.71)has the characteristic equationpd – 1 = (r2 + 1)(r² – 1) = (r + i)(r – i)(r + 1)(r – 1),(4.72)and roots rị-i, r2 = +i, r3 = -1, r4 = +1. Since exp(±in/2) = ±i, wehave the following fundamental set of solutions:.(1)e-ink/2(2)= e?nk/2(4.73)(3)(4)= (-1)*, y = 1.(1)Note that Ycan be written in the equivalent formsYk(2)and(1)= cos(Tk/2), T = sin(Tk/2).(4.74)Therefore, the general solution to equation (4.71) iskYk = C1 cos(rk/2)+ c2 sin(Tk/2) + c3(-1)* + c4,(4.75)where c1, c2, C3, and c4 are arbitrary constants.

To Determine :- The characteristics equation .

The equation kk+4 – Yk = (4.71) has the characteristic equation pd – 1 = (r2 + 1)(r² – 1) = (r + i)(r – i)(r + 1)(r – 1), (4.72) and roots r1 = -i, r2 = +i, r3 = -1, r4 = +1. Since exp(±in/2) = ±i, we have the following fundamental set of solutions: .(1) = e e-ink/2. (2) Yk = eink/2 (4.73) (3) (4) y = (-1)*, = 1.

The equation kk+4 – Yk = (4.71) has the characteristic equation pd – 1 = (r2 + 1)(r² – 1) = (r + i)(r – i)(r + 1)(r – 1), (4.72) and roots r1 = -i, r2 = +i, r3 = -1, r4 = +1. Since exp(±in/2) = ±i, we have the following fundamental set of solutions: .(1) = e e-ink/2. (2) Yk = eink/2 (4.73) (3) (4) y = (-1)*, = 1.

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Concept explainers

Family of Curves

A family of curves is a group of curves that are each described by a parametrization in which one or more variables are parameters. In general, the parameters have more complexity on the assembly of the curve than an ordinary linear transformation. These families appear commonly in the solution of differential equations. When a constant of integration is added, it is normally modified algebraically until it no longer replicates a plain linear transformation. The order of a differential equation depends on how many uncertain variables appear in the corresponding curve. The order of the differential equation acquired is two if two unknown variables exist in an equation belonging to this family.

XZ Plane

In order to understand XZ plane, it's helpful to understand two-dimensional and three-dimensional spaces. To plot a point on a plane, two numbers are needed, and these two numbers in the plane can be represented as an ordered pair (a,b) where a and b are real numbers and a is the horizontal coordinate and b is the vertical coordinate. This type of plane is called two-dimensional and it contains two perpendicular axes, the horizontal axis, and the vertical axis.

Euclidean Geometry

Geometry is the branch of mathematics that deals with flat surfaces like lines, angles, points, two-dimensional figures, etc. In Euclidean geometry, one studies the geometrical shapes that rely on different theorems and axioms. This (pure mathematics) geometry was introduced by the Greek mathematician Euclid, and that is why it is called Euclidean geometry. Euclid explained this in his book named 'elements'. Euclid's method in Euclidean geometry involves handling a small group of innately captivate axioms and incorporating many of these other propositions. The elements written by Euclid are the fundamentals for the study of geometry from a modern mathematical perspective. Elements comprise Euclidean theories, postulates, axioms, construction, and mathematical proofs of propositions.

Lines and Angles

In a two-dimensional plane, a line is simply a figure that joins two points. Usually, lines are used for presenting objects that are straight in shape and have minimal depth or width.

Question

Explain the determine red

4.2.9
Example I
The equation
kk+4 -
- Yk = 0
(4.71)
has the characteristic equation
pd – 1 = (r2 + 1)(r² – 1) = (r + i)(r – i)(r + 1)(r – 1),
(4.72)
and roots rị
-i, r2 = +i, r3 = -1, r4 = +1. Since exp(±in/2) = ±i, we
have the following fundamental set of solutions:
.(1)
e-ink/2
(2)
= e?nk/2
(4.73)
(3)
(4)
= (-1)*, y = 1.
(1)
Note that Y
can be written in the equivalent forms
Yk
(2)
and
(1)
= cos(Tk/2), T = sin(Tk/2).
(4.74)
Therefore, the general solution to equation (4.71) is
k
Yk = C1 cos(rk/2)+ c2 sin(Tk/2) + c3(-1)* + c4,
(4.75)
where c1, c2, C3, and c4 are arbitrary constants.

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