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Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET PDF Download

Fundamental relationships

Since an ordinary Laplace transform can be written as a special case of a two-sided transform, and since the two-sided transform can be written as the sum of two one-sided transforms, the theory of the Laplace-, Fourier-, Mellin-, and Z-transforms are at bottom the same subject. However, a different point of view and different characteristic problems are associated with each of these four major integral transforms.

 

Table of selected Laplace transforms

The following table provides Laplace transforms for many common functions of a single variable. For definitions and explanations, see the Explanatory Notes at the end of the table.
Because the Laplace transform is a linear operator:

  • The Laplace transform of a sum is the sum of Laplace transforms of each term.

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

  • The Laplace transform of a multiple of a function is that multiple times the Laplace transformation of that function.

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Using this linearity, and various trigonometric, hyperbolic, and complex number (etc.) properties and/or identities, some Laplace transforms can be obtained from others quicker than by using the definition directly.
The unilateral Laplace transform takes as input a function whose time domain is the non-negative reals, which is why all of the time domain functions in the table below are multiples of the Heaviside step function, u(t). The entries of the table that involve a time delay τ are required to be causal (meaning that τ > 0). A causal system is a system where the impulse response h(t) is zero for all time t prior to t = 0. In general, the region of convergence for causal systems is not the same as that of anticausal systems.

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET


s-Domain equivalent circuits and impedances

The Laplace transform is often used in circuit analysis, and simple conversions to the s-Domain of circuit elements can be made. Circuit elements can be transformed into impedances, very similar to phasor impedances.
Here is a summary of equivalents:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Note that the resistor is exactly the same in the time domain and the s-Domain. The sources are put in if there are initial conditions on the circuit elements. For example, if a capacitor has an initial voltage across it, or if the inductor has an initial current through it, the sources inserted in the s-Domain account for that.
The equivalents for current and voltage sources are simply derived from the transformations in the table above.

 

Examples: How to apply the properties and theorems 

The Laplace transform is used frequently in engineering and physics; the output of a linear time invariant system can be calculated by convolving its unit impulse response with the input signal. Performing this calculation in Laplace space turns the convolution into a multiplication; the latter being easier to solve because of its algebraic form. For more information, see control theory.

The Laplace transform can also be used to solve differential equations and is used extensively in electrical engineering. The Laplace transform reduces a linear differential equation to an algebraic equation, which can then be solved by the formal rules of algebra. The original differential equation can then be solved by applying the inverse Laplace transform. The English electrical engineer Oliver Heaviside first proposed a similar scheme, although without using the Laplace transform; and the resulting operational calculus is credited as the Heaviside calculus.


Example 1: Solving a differential equation 

In nuclear physics, the following fundamental relationship governs radioactive decay: the number of radioactive atoms N in a sample of a radioactive isotope decays at a rate proportional to N. This leads to the first order linear differential equation

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

where λ is the decay constant. The Laplace transform can be used to solve this equation.
Rearranging the equation to one side, we have

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Next, we take the Laplace transform of both sides of the equation:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

where

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

and

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Solving, we find

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Finally, we take the inverse Laplace transform to find the general solution

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

which is indeed the correct form for radioactive decay.


Example 2: Deriving the complex impedance for a capacitor

In the theory of electrical circuits, the current flow in a capacitor is proportional to the capacitance and rate of change in the electrical potential (in SI units). Symbolically, this is expressed by the differential equation

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

where C is the capacitance (in farads) of the capacitor, i = i(t) is the electric current (in amperes) through the capacitor as a function of time, and v = v(t) is the voltage (in volts) across the terminals of the capacitor, also as a function of time.
Taking the Laplace transform of this equation, we obtain

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

where

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

and

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Solving for V(s) we have

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

The definition of the complex impedance Z (in ohms) is the ratio of the complex voltage V divided by the complex current I while holding the initial state V o at zero:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Using this definition and the previous equation, we find:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

which is the correct expression for the complex impedance of a capacitor.


Example 3: Method of partial fraction expansion 

Consider a linear time-invariant system with transfer function

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

The impulse response is simply the inverse Laplace transform of this transfer function:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

To evaluate this inverse transform, we begin by expanding H(s) using the method of partial fraction expansion:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

The unknown constants P and R are the residues located at the corresponding poles of the transfer function. Each residue represents the relative contribution of that singularity to the transfer function's overall shape. By the residue theorem, the inverse Laplace transform depends only upon the poles and their residues. To find the residue P, we multiply both sides of the equation by s + α to get

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Then by letting s = −α, the contribution from R vanishes and all that is left is

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Similarly, the residue R is given by

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Note that

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

and so the substitution of R and P into the expanded expression for H(s) gives

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Finally, using the linearity property and the known transform for exponential decay (see Item #3 in the Table of Laplace Transforms, above), we can take the inverse Laplace transform of H(s) to obtain:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

which is the impulse response of the system.


Example 3.2: Convolution 

The same result can be achieved using the convolution property as if the system is a series of filters with transfer functions of 1/(s+a) and 1/(s+b). That is, the inverse of

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

is

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Example 4: Mixing sines, cosines, and exponentials

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Starting with the Laplace transform

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

we find the inverse transform by first adding and subtracting the same constant α to the numerator:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

By the shift-in-frequency property, we have

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Finally, using the Laplace transforms for sine and cosine (see the table, above), we have

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

 

Example 5: Phase delay

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Starting with the Laplace transform,

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

we find the inverse by first rearranging terms in the fraction:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

We are now able to take the inverse Laplace transform of our terms:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

This is just the sine of the sum of the arguments, yielding:

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

We can apply similar logic to find that

Laplace Transform - 2 | Physics for IIT JAM, UGC - NET, CSIR NET

Example 6: Determining structure of astronomical object from spectrum 

The wide and general applicability of the Laplace transform and its inverse is illustrated by an application in astronomy which provides some information on the spatial distribution of matter of an astronomical source of radiofrequency thermal radiation too distant to resolve as more than a point, given its flux density spectrum, rather than relating the time domain with the spectrum (frequency domain).
Assuming certain properties of the object, e.g. spherical shape and constant temperature, calculations based on carrying out an inverse Laplace transformation on the spectrum of the object can produce the only possible model of the distribution of matter in it (density as a function of distance from the center) consistent with the spectrum. When independent information on the structure of an object is available, the inverse Laplace transform method has been found to be in good agreement.

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FAQs on Laplace Transform - 2 - Physics for IIT JAM, UGC - NET, CSIR NET

1. What is the Laplace transform?
Ans. The Laplace transform is a mathematical transformation used in physics and engineering to simplify the analysis of linear time-invariant systems. It converts a function of time into a function of a complex variable, s, which represents the frequency domain. The Laplace transform is particularly useful in solving differential equations, as it converts them into algebraic equations that are easier to solve.
2. How is the Laplace transform applied in physics?
Ans. The Laplace transform is applied in physics to solve differential equations and analyze the behavior of physical systems. By taking the Laplace transform of a differential equation, it can be transformed into an algebraic equation that can be easily solved. This allows physicists to study the response of systems to various inputs, such as forces or voltages, and understand their behavior in the frequency domain.
3. What are the advantages of using Laplace transform in physics?
Ans. The advantages of using the Laplace transform in physics are: - It simplifies the analysis of linear time-invariant systems by converting differential equations into algebraic equations. - It allows for the study of system behavior in the frequency domain, providing insights into the system's response to different inputs. - It enables the use of powerful mathematical techniques, such as complex analysis, to solve problems. - It provides a mathematical framework for analyzing and designing control systems, electrical circuits, and other physical systems. - It facilitates the understanding of system stability, transient response, and steady-state behavior.
4. Can the Laplace transform be used to solve any differential equation in physics?
Ans. The Laplace transform can be used to solve many types of differential equations encountered in physics, particularly those that are linear and time-invariant. However, it may not be applicable to all differential equations, especially those that involve nonlinearities or time-varying coefficients. In such cases, alternative methods like numerical techniques or specialized transforms may be required.
5. Are there any limitations or challenges in using the Laplace transform in physics?
Ans. While the Laplace transform is a powerful tool in physics, it does have some limitations and challenges. Some of these include: - It may not be applicable to nonlinear systems or those with time-varying coefficients. - Inverse Laplace transform, required to obtain the time-domain solution, can be challenging for certain functions or complex transforms. - The Laplace transform assumes linearity and time-invariance, which may not always hold true in real-world physical systems. - The Laplace transform may introduce additional complexity and mathematical manipulations compared to direct time-domain analysis. - The choice of initial conditions and appropriate region of convergence can sometimes be nontrivial, leading to incorrect or ambiguous results.
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