Antiderivative be an antiderivative of a function…

Problem 2

Antiderivatives Can two different functions both …

01:45

Problem 2

Antiderivatives Can two different functions both be antiderivatives of the same function? Explain.

Problem 3

Particular Solution What is a particular solution of a differential equation?

Problem 4

General and Particular Solutions Describe the difference between the general solution and a particular
solution of a differential equation.

Problem 5

Integration and Differentiation In Exercises 5 and 6 verify the statement by showing that the derivative of the right side equals the integrand on the left side.
$\int\left(-\frac{6}{x^{4}}\right) d x=\frac{2}{x^{3}}+C$

Problem 6

Integration and Differentiation In Exercises 5 and 6 verify the statement by showing that the derivative of the right side equals the integrand on the left side.
$\int\left(8 x^{3}+\frac{1}{2 x^{2}}\right) d x=2 x^{4}-\frac{1}{2 x}+C$

Sherrie F.

University of Houston

Problem 1

Antiderivative be an antiderivative of a function $f$ on an interval $I$ ?

Answer

A function $F$ is an antiderivetive of a function fon the interval Iif $F(x)=f(x)$ for all $x$ is and $C$ is an arbittary constant

Antiderivatives and Indefinite Integration

Calculus of a Single Variable

Topics

Indefinite Integrals

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Video Transcript

question one. An anti derivative being anti derivative of a function. So when does that happen? Well, that happened it. A line of eggs equals f of X clothes in your hole for all axes. Better in are close Interval I. So that's mass speak for all axes that are elements in I So the closed interval in high?

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