Average Value of a Function

Limit Definition of a Derivative

Which of the following is an example of determining the limit of a rational function at infinity by comparing the leading coefficients of the highest-degree terms?

Derivative of a Quadratic Function

Evaluating a Function Defined by an Integral

Finding Real Solutions of a Derivative

Product and Chain Rule Differentiation

Chain Rule With The Power Rule

Interpreting a Derivative in Context

Particular Solution to a Differential Equation

Basic Indefinite Integration Rules

Particle Motion From Acceleration

Power Rule with Radical Functions

Derivative Using The Chain Rule

Properties of Separation of Variables

L'Hôpital's Rule for Limits at Infinity

A rocket’s altitude is given by $$h(t)= 5*t^2+10*t$$ (in meters) for time t in seconds. Compute the instantaneous acceleration (the second derivative) at $$t=3$$ seconds.

Chain Rule with Logarithmic Functions

I. Graphically, the average value of a function on an interval corresponds to the height of a rectangle with the same area as the region under the curve. II. If a function has portions above and below its average value on an interval, then the definite integral over that interval must equal zero. III. For a function that is always positive, its average value will always be less than its maximum value. Which of the above statements about the graphical interpretation of average values is/are true?

Limit Definition of the Derivative