What is the integral of e^x?

Unlock all questions

This demo includes only 20 questions. Upgrade to access hundreds of questions, flashcards, exam simulations, and disable ads.

Full question bankExam simulationsFlashcards
From $9.99Unlock all

Prepare for the ASMEPPS Mathematics Test. Use flashcards and multiple choice questions, each question includes hints and explanations. Achieve success in your exam!

Multiple Choice

What is the integral of e^x?

Explanation:
The integral of \( e^x \) with respect to \( x \) is indeed expressed as \( e^x + C \), where \( C \) represents the constant of integration. This result arises from the fundamental properties of exponential functions. The unique characteristic of the exponential function \( e^x \) is that it is its own derivative, which means that when we take the integral—essentially working backward from differentiation—the process yields \( e^x \) again. Adding the constant \( C \) is essential because integrals represent a family of functions that differ by a constant; thus, you need that constant term to encompass all possible antiderivatives of the function. Other options do not reflect the correct integral of \( e^x \). For instance, the option involving subtraction of \( C \) does not adhere to the conventions of integration. The term \( xe^x \) is the form of a product rule application from differentiation, not applicable here for integration. Lastly, the logarithmic term \( \ln(e^x) \) simplifies to \( x \), which does not capture the essence of the integral we're calculating. Overall, \( e^x + C \) accurately denotes the integral of \(

The integral of ( e^x ) with respect to ( x ) is indeed expressed as ( e^x + C ), where ( C ) represents the constant of integration. This result arises from the fundamental properties of exponential functions. The unique characteristic of the exponential function ( e^x ) is that it is its own derivative, which means that when we take the integral—essentially working backward from differentiation—the process yields ( e^x ) again.

Adding the constant ( C ) is essential because integrals represent a family of functions that differ by a constant; thus, you need that constant term to encompass all possible antiderivatives of the function.

Other options do not reflect the correct integral of ( e^x ). For instance, the option involving subtraction of ( C ) does not adhere to the conventions of integration. The term ( xe^x ) is the form of a product rule application from differentiation, not applicable here for integration. Lastly, the logarithmic term ( \ln(e^x) ) simplifies to ( x ), which does not capture the essence of the integral we're calculating. Overall, ( e^x + C ) accurately denotes the integral of (

More Multiple Choice Questions
Subscribe

Get the latest from Examzify

You can unsubscribe at any time. Read our privacy policy