๐Ÿ“ˆcollege algebra review

key term - Joint variation

Definition

Joint variation occurs when a variable depends on two or more other variables, typically expressed as a product of those variables multiplied by a constant. It is represented mathematically as $z = k \cdot x \cdot y$ where $k$ is a non-zero constant.

5 Must Know Facts For Your Next Test

  1. In joint variation, if one variable increases while the others are held constant, the dependent variable will increase proportionally to that change.
  2. The equation for joint variation can be extended to include more variables, such as $z = k \cdot x \cdot y \cdot w$.
  3. Solving problems involving joint variation often requires isolating the constant $k$ by using known values of the variables.
  4. Joint variation combines aspects of both direct and inverse variations but applies to multiple variables simultaneously.
  5. Understanding how to manipulate and solve equations involving joint variation is crucial for modeling real-world scenarios in algebra.

Review Questions

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