(8 Courses Available)
Mean value theorem (K-A)
Extreme value theorem and critical points (K-A)
Intervals on which a function is increasing or decreasing (K-A)
Relative (local) extrema (K-A)
Absolute (global) extrema (K-A)
Concavity and inflection points intro (K-A)
Analyzing concavity and inflection points (K-A)
Second derivative test (K-A)
Sketching curves (K-A)
Connecting f, f', and f'' (K-A)
Solving optimization problems (K-A)
Analyzing implicit relations (K-A)
Meaning of the derivative in context (K-A)
Straight-line motion (K-A)
Non-motion applications of derivatives (K-A)
Introduction to related rates (K-A)
Solving related rates problems (K-A)
Approximation with local linearity (K-A)
L'Hopital's rule (K-A)
L'Hopital's rule: composite exponential functions (K-A)
Average value of a function (K-A)
Straight-line motion (K-A)
Non-motion applications of integrals (K-A)
Area: vertical area between curves (K-A)
Area: horizontal area between curves (K-A)
Volume: squares and rectangles cross sections (K-A)
Volume: triangles and semicircles cross sections (K-A)
Volume: disc method (revolving around x- and y-axes) (K-A)
Volume: disc method (revolving around other axes) (K-A)
Volume: washer method (revolving around x- and y-axes) (K-A)
Volume: washer method (revolving around other axes) (K-A)
Chain rule (K-A)
More chain rule practice (K-A)
Implicit differentiation (K-A)
Implicit differentiation (advanced examples) (K-A)
Differentiating inverse functions (K-A)
Derivatives of inverse trigonometric functions (K-A)
Strategy in differentiating functions (K-A)
Differentiation using multiple rules (K-A)
Second derivatives (K-A)
Disguised derivatives (K-A)
Logarithmic differentiation (K-A)
Proof videos (K-A)
Average vs. instantaneous rate of change (K-A)
Secant lines (K-A)
Derivative definition (K-A)
Estimating derivatives (K-A)
Differentiability (K-A)
Power rule (K-A)
Derivative rules: constant, sum, difference, and constant multiple (K-A)
Combining the power rule with other derivative rules (K-A)
Derivatives of cos(x), sin(x) ln(x) (K-A)
Product rule (K-A)
Quotient rule (K-A)
Derivatives of tan(x), cot(x), sec(x), and csc(x) (K-A)
Proof videos (K-A)
Accumulations of change introduction (K-A)
Approximation with Riemann sums (K-A)
Summation notation review (K-A)
Riemann sums in summation notation (K-A)
Defining integrals with Riemann sums (K-A)
Fundamental theorem of calculus and accumulation functions (K-A)
Interpreting the behavior of accumulation functions (K-A)
Properties of definite integrals (K-A)
Fundamental theorem of calculus and definite integrals (K-A)
Reverse power rule (K-A)
Indefinite integrals of common functions (K-A)
Definite integrals of common functions (K-A)
Integrating with u-substitution (K-A)
Integrating using long division and completing the square (K-A)
Integrating using trigonometric identities (K-A)
Proof videos (K-A)
Limits intro (K-A)
Estimating limits from graphs (K-A)
Estimating limits from tables (K-A)
Formal definition of limits (epsilon-delta) (K-A)
Properties of limits (K-A)
Limits by direct substitution (K-A)
Limits using algebraic manipulation (K-A)
Strategy in finding limits (K-A)
Squeeze theorem (K-A)
Types of discontinuities (K-A)
Continuity at a point (K-A)
Continuity over an interval (K-A)
Removing discontinuities (K-A)
Infinite limits (K-A)
Limits at infinity (K-A)
Intermediate value theorem (K-A)