5 Must Know Facts For Your Next Test

1. The integral of a density function over an interval gives the total mass or probability for that interval.
2. A continuous density function $\rho(x)$ describes how mass is distributed along a rod or other object.
3. The center of mass can be found using the formula $\frac{1}{M} \int_a^b x \rho(x) \, dx$, where $M$ is the total mass.
4. For probability density functions, the area under the curve must equal 1 over the entire range.
5. Moments about a point can be calculated using integrals involving the density function and distance terms.

Review Questions

• What is the integral of a density function over an interval used to find?
• How would you find the center of mass for a rod with a given density function $\rho(x)$?
• Why must the area under a probability density function equal 1?

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