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Chapter 4: Q. 66 (page 363)

Solve each of the integrals in Exercises 63鈥�68, where a, b, and c are real numbers with
$a 鈮� 0, b 鈮� 0, c > 1, a n d c 鈮� 0 . 鈭� (b (c^{x}) + a) d x .$

Short Answer

Expert verified

The value of the integral is $b c^{x} \ln c + a x + k .$

Step by step solution

01

Step 1. Given Information.

Given is a integral:

$鈭� (b (c^{x}) + a) d x, a 鈮� 0, b 鈮� 0, c > 1, a n d c 鈮� 0, a n d a, b, a n d c a r e c o n s \tan t s .$

02

Step 2. Formula involved.

$鈭� a^{x} d x = a^{x} \ln a + k .$

03

Step 3. Solving the integral.

$鈭� (b (c^{x}) + a) d x = 鈭� b (c^{x}) d x + 鈭� a d x = b c^{x} \ln c + a x + k .$

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Most popular questions from this chapter

Calculate the exact value of each definite integral in Exercises 47鈥�52 by using properties of definite integrals and the formulas in Theorem 4.13.

${鈭�}_{0}^{4} ((2 x - 3)^{2} + 5) d x$

Prove that ${鈭�}_{1}^{3} (3 x + 4) d x = 20$ in three different ways:

(a) algebraically, by calculating a limit of Riemann sums;

(b) geometrically, by recognizing the region in question as a trapezoid and calculating its area;

(c) with formulas, by using properties and formulas of definite integrals.

Use the Fundamental Theorem of Calculus to find the exact values of the given definite integrals. Use a graph to check your answer.

${鈭�}_{1}^{4} 鈥� \frac{2 x + 3}{x^{2} + 3 x + 4} d x$

Use integration formulas to solve each integral in Exercises 21鈥�62. You may have to use algebra, educated guess- and- check, and/or recognize an integrand as the result of a product, quotient, or chain rule calculation. Check each of your answers by differentiating. (Hint for Exercise 54: $\tan (x) = \frac{\sin (x)}{\cos (x)}$ ).

$鈭� \frac{2 x \ln x - x}{{(\ln x)}^{2}} d x .$

Use integration formulas to solve each integral in Exercises 21鈥�62. You may have to use algebra, educated guess- and- check, and/or recognize an integrand as the result of a product, quotient, or chain rule calculation. Check each of your answers by differentiating. (Hint for Exercise 54: $\tan (x) = \frac{\sin (x)}{\cos (x)}$ ).

$鈭� \frac{e^{3 x} - 2 e^{4 x}}{e^{2 x}} d x$ .

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