5 Must Know Facts For Your Next Test

1. In right-endpoint approximation, the width of each rectangle is determined by dividing the interval into equal parts.
2. The formula for calculating an individual rectangle's area in this method is $f(x_i) \Delta x$, where $x_i$ is the right endpoint.
3. It tends to overestimate or underestimate depending on whether the function is increasing or decreasing.
4. The sum of all rectangular areas gives an estimate for the integral over the interval.
5. As you increase the number of subintervals, the approximation generally becomes more accurate.

Review Questions

• How do you determine the height of each rectangle in a right-endpoint approximation?
• Explain why increasing the number of subintervals improves the accuracy of a right-endpoint approximation.
• What happens to a right-endpoint approximation when applied to an increasing versus a decreasing function?

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