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| Accuracy | Question | Correct/Attempt | Last Answer |
|---|---|---|---|
| 0% | The graph above represents the function $$h(x)=\frac{1}{x^2+1}$$ on the interval $$[-2, 2]$$. Determine the absolute minimum value of $$h(x)$$ on this interval. AP Calculus AB / Unit 5: Analytical Applications of Differentiation | 0/2 | March 11, 2026 19:07 |
| 100% | Value of a Derivative at a Point AP Calculus AB / Unit 5: Analytical Applications of Differentiation | 1/1 | March 11, 2026 19:05 |
| 100% | Absolute Extrema On A Closed Interval AP Calculus AB / Unit 5: Analytical Applications of Differentiation | 1/1 | March 11, 2026 19:01 |
| 100% | Quotient Rule Using a Table AP Calculus AB / Unit 5: Analytical Applications of Differentiation | 1/1 | March 11, 2026 18:51 |
| 100% | Critical Numbers of a Rational Function AP Calculus AB / Unit 5: Analytical Applications of Differentiation | 1/1 | March 11, 2026 18:46 |
| 100% | Derivative of an Inverse Function AP Calculus AB / Unit 5: Analytical Applications of Differentiation | 1/1 | March 11, 2026 18:44 |
| 100% | Slope of a Tangent Line AP Calculus AB / Unit 5: Analytical Applications of Differentiation | 1/1 | March 11, 2026 18:37 |
| 100% | For the function $$f(x)= \ln(x)$$ defined on the interval [1, e], the Mean Value Theorem guarantees a value c in (1, e) such that $$f'(c)= \frac{f(e)-f(1)}{e-1}$$. Given that $$f'(x)=\frac{1}{x}$$, solve for c. AP Calculus AB / Unit 5: Analytical Applications of Differentiation | 1/1 | March 11, 2026 18:34 |
| 50% | Derivative of Inverse Trig and Power Function AP Calculus AB / Unit 5: Analytical Applications of Differentiation | 1/2 | March 11, 2026 18:27 |
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