Textbook Question
Evaluating integrals Evaluate the following integrals.
∫₋₂² (3𝓍⁴―2𝓍 + 1) d𝓍
Ch. 5 - Integration
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243
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Table of contents
- Ch. 1 - Functions210
- Ch. 2 - Limits371
- Ch. 3 - Derivatives633
- Ch. 4 - Applications of the Derivative412
- Ch. 5 - Integration328
- Ch. 6 - Applications of Integration331
- Ch. 7 - Logarithmic, Exponential Functions, and Hyperbolic Functions177
- Ch. 8 - Integration Techniques394
- Ch. 9 - Differential Equations179
- Ch. 10 - Sequences and Infinite Series339
- Ch. 11 - Power Series218
- Ch.12 - Parametric and Polar Curves215
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243Not the one you use?Change textbook
Chapter 5, Problem 5.R.30
Evaluate the following derivatives.
d/d𝓍 ∫₃ᵉˣ cos t² dt
Verified step by step guidance1
Step 1: Recognize that the problem involves differentiating an integral with variable limits. This is a classic application of the Leibniz rule for differentiation under the integral sign.
Step 2: Recall the Fundamental Theorem of Calculus, which states that if you have an integral of the form ∫ₐᵇ f(t) dt, where the limits of integration are functions of x, the derivative with respect to x is given by: d/d𝓍 ∫ₐᵇ f(t) dt = f(b) * (db/d𝓍) - f(a) * (da/d𝓍).
Step 3: Identify the limits of integration in the given problem. The lower limit is a constant (3), and the upper limit is eˣ, which is a function of x. This means da/d𝓍 = 0 and db/d𝓍 = d/d𝓍(eˣ) = eˣ.
Step 4: Substitute the limits into the formula. The derivative becomes: cos((eˣ)²) * eˣ - cos(3²) * 0. Note that the second term vanishes because the derivative of a constant lower limit is zero.
Step 5: Simplify the expression. The final derivative is cos((eˣ)²) * eˣ. This is the result after applying the Leibniz rule and simplifying.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Fundamental Theorem of Calculus
The Fundamental Theorem of Calculus links differentiation and integration, stating that if F is an antiderivative of f on an interval [a, b], then the integral of f from a to b can be computed using F. This theorem allows us to evaluate the derivative of an integral function, which is essential for solving the given problem.
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Fundamental Theorem of Calculus Part 1
Differentiation Under the Integral Sign
Differentiation under the integral sign is a technique that allows us to differentiate an integral with respect to a parameter. In this case, we differentiate the integral of cos(t²) with respect to x, treating the limits of integration as constants. This method is crucial for evaluating the derivative of the given integral expression.
Recommended video:
05:53Finding Differentials
Chain Rule
The Chain Rule is a fundamental principle in calculus used to differentiate composite functions. When applying the Chain Rule, we differentiate the outer function and multiply it by the derivative of the inner function. In the context of the given problem, it helps in evaluating the derivative of the integral with respect to x, especially when the limits of integration are functions of x.
Recommended video:
05:02Intro to the Chain Rule
Related Practice
Textbook Question
Area by geometry Use geometry to evaluate the following definite integrals, where the graph of ƒ is given in the figure.
(b) ∫₆⁴ ƒ(𝓍) d𝓍
1
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Textbook Question
Find the intervals on which ƒ(𝓍) = ∫ₓ¹ (t―3) (t―6)¹¹ dt is increasing and the intervals on which it is decreasing.
1
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Textbook Question
Area by geometry Use geometry to evaluate the following definite integrals, where the graph of ƒ is given in the figure.
(a) ∫₀⁴ ƒ(𝓍) d𝓍
1
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Textbook Question
Area functions and the Fundamental Theorem Consider the function
ƒ(t) = { t if ―2 ≤ t < 0
t²/2 if 0 ≤ t ≤ 2
and its graph shown below. Let F(𝓍) = ∫₋₁ˣ ƒ(t) dt and G(𝓍) = ∫₋₂ˣ ƒ(t) dt.
(b) Use the Fundamental Theorem to find an expression for F '(𝓍) for ―2 ≤ 𝓍 < 0.
1
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Textbook Question
Area functions and the Fundamental Theorem Consider the function
ƒ(t) = { t if ―2 ≤ t < 0
t²/2 if 0 ≤ t ≤ 2
and its graph shown below. Let F(𝓍) = ∫₋₁ˣ ƒ(t) dt and G(𝓍) = ∫₋₂ˣ ƒ(t) dt.
(e) Evaluate F ''(―1) and F ''(1). Interpret these values.