5 Must Know Facts For Your Next Test

1. The limits of integration determine the boundaries of the area under the curve being calculated.
2. Changing the limits of integration changes the value of the definite integral.
3. If the limits of integration are equal, i.e., $a = b$, then the value of the definite integral is zero.
4. Swapping the limits of integration ($\int_{a}^{b}$ vs. $\int_{b}^{a}$) results in negating the value of the integral.
5. Properly setting up and evaluating integrals requires correctly identifying and applying these limits.

Review Questions

• What happens to the value of a definite integral if its upper and lower limits are swapped?
• How do you interpret an integral with equal upper and lower limits?
• Why is it important to correctly identify and apply limits of integration when calculating a definite integral?

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