II cos(s5) dt ds

Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
Question

Evaluate the iterated integral.

The image shows a double integral expressed as follows:

\[
\int_{0}^{1} \int_{0}^{s^4} \cos(s^5) \, dt \, ds
\]

### Explanation:

- **Double Integral**: This expression represents a double integral, which is used to evaluate the integral of a function of two variables over a region in a plane.
  
- **Integration Limits**: 
  - The outer integral \(\int_{0}^{1}\) indicates that the integration with respect to \(s\) ranges from 0 to 1.
  - The inner integral \(\int_{0}^{s^4}\) suggests integration with respect to \(t\) within the bounds 0 to \(s^4\), showing that the upper limit of integration for \(t\) depends on the variable \(s\).

- **Integrand**: \(\cos(s^5)\) is the function being integrated. It implies a cosine function where the angle is raised to the fifth power of \(s\).

The context of this mathematical expression could be used to demonstrate techniques of multivariable calculus, specifically in performing iterated integrals.
Transcribed Image Text:The image shows a double integral expressed as follows: \[ \int_{0}^{1} \int_{0}^{s^4} \cos(s^5) \, dt \, ds \] ### Explanation: - **Double Integral**: This expression represents a double integral, which is used to evaluate the integral of a function of two variables over a region in a plane. - **Integration Limits**: - The outer integral \(\int_{0}^{1}\) indicates that the integration with respect to \(s\) ranges from 0 to 1. - The inner integral \(\int_{0}^{s^4}\) suggests integration with respect to \(t\) within the bounds 0 to \(s^4\), showing that the upper limit of integration for \(t\) depends on the variable \(s\). - **Integrand**: \(\cos(s^5)\) is the function being integrated. It implies a cosine function where the angle is raised to the fifth power of \(s\). The context of this mathematical expression could be used to demonstrate techniques of multivariable calculus, specifically in performing iterated integrals.
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