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  2. For business economics
  3. Chapter 1: Functions of one variable
  4. Applications
  5. Break-even
  6. Example 1

Example 1

We consider the revenue function $R(x)=10x$ and the cost function $C(x)=8x+30$ and we determine the break-even point.

This implies the following:
$$\begin{align}
R(x)  = C(x) & \Leftrightarrow 10x=8x+30\\
& \Leftrightarrow 2x=30\\
& \Leftrightarrow x=15.
\end{align}$$

Hence, the break-even point is $x=15$.
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Wiskunde Mathematics for business economics leeromgeving

 

  • Chapter 1: Functions of one variable
    • Definitions
    • Power functions and polynomial functions
    • Exponential and logarithmic functions
    • Applications
      • Break-even
        • Example 1
        • Exercise 1
        • Example 2
        • Exercise 2
      • Market equilibrium
  • Chapter 2: Differentiation of functions of one variable
  • Chapter 3: Functions of two variables
  • Chapter 4: Differentiation of functions of two variables
  • Chapter 5: Optimization
  • Chapter 6: Areas and integrals

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