What will you learn in this course?

Master techniques for calculating definite and indefinite integrals using fundamental rules and methods
Apply integration to solve real-world problems involving area, volume, and accumulation
Utilize the Fundamental Theorem of Calculus to connect differentiation and integration effectively
Identify and evaluate integrals involving polynomial, exponential, and trigonometric functions
Implement substitution and integration by parts for complex integral problems

Analyze the relationship between derivatives and integrals to simplify calculus computations
Solve problems related to average value, displacement, and total accumulation using integration
Develop skills to interpret and graph functions involving integrals in various contexts
Apply integration concepts to physics, engineering, and economics for practical problem-solving
Enhance mathematical reasoning and critical thinking through integration techniques

How to Get The Certificate

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Lessons | 33

00:05:42

integral of arcsin x

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The fundamental use of integration is as a continuous version of summing. But, paradoxically, often integrals are computed by viewing integration as essentially an inverse operation to differentiation. (That fact is the so-called Fundamental Theorem of Calculus.)

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integral of arcsin x

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