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Chapter 4: Problem 63

Prove that $$\int_{a}^{b} x d x=\frac{b^{2}-a^{2}}{2}$$

Short Answer

Expert verified
Thus, \(∫_{a}^{b} x dx = \frac{b^{2}-a^{2}}{2}\).

Step by step solution

01

Find the indefinite integral

The indefinite integral of \(x\) is \(∫x dx = \frac{x^2}{2} + C\), where \(C\) is the constant of integration.
02

Apply the Fundamental Theorem of Calculus

The Fundamental Theorem of Calculus states that \(∫_{a}^{b} f(x) dx = F(b) - F(a)\), where \(F(x)\) is the antiderivative of \(f(x)\). So, \(∫_{a}^{b}xdx = \frac{b^2}{2} - \frac{a^2}{2}\).
03

Simplify the result

By combining the fraction, the result is \(\frac{b^2 - a^2}{2}\).

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Definite Integrals
Definite integrals are an essential concept in calculus that help calculate the area under a curve between two specific points on the x-axis, often referred to as the limits of integration. In our example, these limits are from point \(a\) to point \(b\).
This process essentially lets us sum an infinite number of small areas under the curve.
  • Definite integrals result in a numerical value.
  • The limits of integration \(a\) and \(b\) are crucial.
  • The value of the definite integral represents the net area between the function and the x-axis.

The result will often be dependent on the substitution of these limits into an antiderivative, a function closely related to indefinite integrals. The process leverages the power of the Fundamental Theorem of Calculus.
Antiderivatives
An antiderivative can be thought of as a function that 'undoes' the operation of differentiation. When you know a derivative \(f(x)\), finding its antiderivative \(F(x)\) means identifying the function of which it is the derivative. This step is crucial in integrating functions.
In simpler terms, if you differentiate the antiderivative, you get back the original function:
  • If \(f(x) = x\), then the antiderivative \(F(x) = \frac{x^2}{2}\) plus a constant \(C\).
  • The constant \(C\) is introduced because differentiation of a constant is zero.

Identifying the correct antiderivative is key to applying definite integrals. The effort is made much clearer when utilizing the Fundamental Theorem of Calculus, which seamlessly connects antiderivatives to the evaluation of definite integrals.
Indefinite Integrals
While definite integrals provide a specific value, indefinite integrals involve the entire family of functions formed by adding varying constants to an antiderivative. This is because the integration process is essentially reversing differentiation, where the constant term is lost.
Mathematically, integrating \(f(x)=x\) results in the indefinite integral:
  • \(∫x \, dx = \frac{x^2}{2} + C\)
  • The \(+C\) represents an entire family of functions with different vertical shifts.
  • Every different value of \(C\) gives you a unique function, which results from losing the constant during differentiation.

Understanding indefinite integrals is fundamental to acquiring the knowledge to find specific definite integrals, establishing a base for forming the antiderivative needed for precise area calculations between limits.

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Find the derivative of the function. \(y=2 x \sinh ^{-1}(2 x)-\sqrt{1+4 x^{2}}\)

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