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\[f(t)\]
\[t\]
Qual é a taxa de variação média de 
\[f\] ao longo do intervalo 
\[[-1,4]\]?
Responda com um número exato.


Para encontrar a taxa de variação média de \( f(t) \) ao longo do intervalo \([-1, 4]\), usaremos a fórmula:

\[
\text{Taxa de variação média} = \frac{f(b) - f(a)}{b - a}
\]

Aqui, \( a = -1 \) e \( b = 4 \).

Os pontos correspondentes são:

- \( f(-1) = -7 \) (o ponto dado é \((-1, -7)\))
- \( f(4) = 0 \) (o ponto dado é \((4, 0)\))

Substituindo na fórmula:

\[
\text{Taxa de variação média} = \frac{f(4) - f(-1)}{4 - (-1)} = \frac{0 - (-7)}{4 + 1} = \frac{0 + 7}{5} = \frac{7}{5}
\]

Portanto, a taxa de variação média de \( f(t) \) ao longo do intervalo \([-1, 4]\) é \(\frac{7}{5}\).

Would you like more details or have any questions? Here are some related questions to explore:

1. What does the value of \(\frac{7}{5}\) represent in the context of the function's behavior?
2. How would the average rate of change differ if the interval were changed to \([-1, 0]\)?
3. What does it mean if the average rate of change is greater than 1?
4. How does the average rate of change relate to the steepness of the graph?
5. What is the geometric interpretation of a positive versus negative average rate of change?
6. Can the average rate of change be used to estimate the function's behavior outside the interval \([-1, 4]\)?
7. How does this concept of rate of change apply in real-world scenarios?
8. How can the average rate of change help determine if a function is linear or nonlinear?

**Tip:** The average rate of change between two points on a curve gives insight into the overall trend of the function, but it may not capture variations within the interval.

Explore how to calculate the average rate of change of a function from -1 to 4 using the given points (-1, -7) and (4, 0). Understand the concept of rate of change in Cartesian coordinates and its application in mathematical analysis. Suitable for high school students.

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