Pre-Calc/Chapter 10: Intro to Calculus: Limits, Derivatives, and Integrals
Matching Calculus Concepts
Match these key calculus concepts with the appropriate description.]]>
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Slope of a tangent line to a function]]>
Derivative
Derivative of displacement function at a specific time]]>
Instantaneous Velocity
Area between function and the x-axis and between lower and upper bounds]]>
Integral
Limit
Rehoovelator
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
Part-time
Riemann Sums
<question><correctAnswers><correctAnswer></correctAnswer></correctAnswers></question>