Chapter 1: Q45P (page 49)

Question: Evaluate the following integrals:
(a) $\int_{- 2}^{2} (2 x + 3) δ (3 x) d x$
(b) $\int_{0}^{2} (x^{3} + 3 x + 2) δ (1 - x) d x$
(c) $\int_{- 4}^{1} 9 x^{2} δ (3 x + 1) d x$
(d) $\int_{- \infty}^{a} δ (x - b) d x$

Short Answer

Expert verified

(a) The result of $l = \int_{- 2}^{2} (2 x + 3) δ (3 x) d x$ in part (a) is 1.

(b) The result of $l = \int_{- 2}^{2} (x^{3} + 3 x + 2) δ (1 - x) d x$ in part (b) is 6.

(d) For $b < a$ , $\int_{- \infty}^{a} δ (x - b) d x = 1$ , and for $b < a$ , $\int_{- \infty}^{a} δ (x - b) d x = 0$ .

Step by step solution

Define the Dirac delta function

The Dirac delta function, which is represented as $δ (x)$ , is defined as

$δ (x) = {\begin{cases} 0 x \neq 0 \\ \infty x = 0 \end{cases}$

The Dirac delta function has the property $\int_{- \infty}^{\infty} f (x) δ (x) d x = f (0)$ , where $f (x)$ is a continuous containing $x = 0$

Prove the integral in part (a)

Let the given integral be $l = \int_{- 2}^{2} (2 x + 3) δ (x) d x$ . Use the property $δ (k x) = \frac{1}{|k|} δ x$ into the integral l . $l = \frac{1}{3} \int_{- 2}^{2} (2 x + 3) δ (x) d x$

Substitute x = 0 into the initial term of $l = \frac{1}{3} \int_{- 2}^{2} (2 x + 3) δ (x) d x$ .

$l = \frac{1}{3} \int_{- 2}^{2} (2 (0) + 3) δ (x) d x = \frac{1}{3} \int_{- 2}^{2} 3 δ (x) d x = \int_{- 2}^{2} δ (x) d x = 1$

Thus, the result of $l = \int_{- 2}^{2} (2 x + 3) δ (x) d x$ in part (a) is 1.

Step: 3 Prove the integral in part (a)

Let the given integral be $l = \int_{- 2}^{2} (x^{3} + 3 x + 2) δ (1 - x) d x$ . Substitute x = 1 into the initial term of $l = \int_{- 2}^{2} (x^{3} + 3 x + 2) δ (1 - x) d x$

$l = \int_{- 2}^{2} ({(1)}^{3} + 3 (1) + 2) δ (1 - x) d x l = \int_{- 2}^{2} 6 δ (1 - x) d x l = 6 \int_{- 2}^{2} δ (1 - x) d x l = 6$

Thus, the result of $l = \int_{- 2}^{2} (x^{3} + 3 x + 2) δ (1 - x) d x$ in part (b) is 6.

Step: 4 Prove the integral in part (c)

Let the given integral be $l = \int_{- 1}^{1} (9 x^{2}) δ (3 x + 1) d x$ . Rearrange the integral l , using the property $δ (k x) = \frac{1}{|k|} δ {(x)}_{1}$

$l = \int_{- 1}^{1} (9 x^{2}) δ (3 (x + \frac{1}{3})) d x = \frac{1}{3} \int_{- 1}^{1} (9 x^{2}) δ (x + \frac{1}{3}) d x$

Substitute $x = - \frac{1}{3}$ into the initial term of $= \frac{1}{3} \int_{- 1}^{1} (9 x^{2}) δ (x + \frac{1}{3}) d x$

$l = \frac{1}{3} \int_{- 1}^{1} (9 {(- \frac{1}{3})}^{2}) δ (x + \frac{1}{3}) d x = \frac{1}{3} \int_{- 1}^{1} (\frac{9}{9}) δ (x + \frac{1}{3}) d x = \frac{1}{3} \int_{- 1}^{1} δ (x + \frac{1}{3}) d x = \frac{1}{3}$

Thus, the result of $l = \int_{- 1}^{1} (9 x^{2}) δ (3 x + 1) d x$ in part (c) is $\frac{1}{3}$ .

Step: 4 Prove the integral in part (d)

Let the given integral be $l = \int_{- \infty}^{a} δ (x - b) d x$ . If $b < a$ , the Dirac delta function $δ (x - b)$ is defined within the interval of integration. Thus $\int_{- \infty}^{a} δ (x - b) d x = 1$ , for $b < a$

If $b < a$ , the Dirac delta function $δ (x - b)$ lies outside the interval of integration.

Thus, $\int_{- \infty}^{a} δ (x - b) d x = 0$ , for $b > a$ $b > a$ .

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Question: Evaluate the following integrals:
(a) $\int_{- 2}^{2} (2 x + 3) δ (3 x) d x$
(b) $\int_{0}^{2} (x^{3} + 3 x + 2) δ (1 - x) d x$
(c) $\int_{- 4}^{1} 9 x^{2} δ (3 x + 1) d x$
(d) $\int_{- \infty}^{a} δ (x - b) d x$

Short Answer

Step by step solution

Define the Dirac delta function

Prove the integral in part (a)

Step: 3 Prove the integral in part (a)

Step: 4 Prove the integral in part (c)

Step: 4 Prove the integral in part (d)

One App. One Place for Learning.

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Question: Evaluate the following integrals:(a)∫-22(2x+3)δ(3x)dx(b)∫02(x3+3x+2)δ(1-x)dx(c)∫-419x2δ(3x+1)dx(d)∫-∞aδ(x-b)dx

Short Answer

Step by step solution

Define the Dirac delta function

Prove the integral in part (a)

Step: 3 Prove the integral in part (a)

Step: 4 Prove the integral in part (c)

Step: 4 Prove the integral in part (d)

One App. One Place for Learning.

Most popular questions from this chapter

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Translational Dynamics

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Particle Model of Matter

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Study anywhere. Anytime. Across all devices.

Question: Evaluate the following integrals:
(a) $\int_{- 2}^{2} (2 x + 3) δ (3 x) d x$
(b) $\int_{0}^{2} (x^{3} + 3 x + 2) δ (1 - x) d x$
(c) $\int_{- 4}^{1} 9 x^{2} δ (3 x + 1) d x$
(d) $\int_{- \infty}^{a} δ (x - b) d x$