Contents: Lecture 1: The Idea of Limits - Definition and Rules of Limits; Lecture 2: One-sided Limits and Limits at infinity - Infinite Limits; Lecture 3: Continuity; Lecture 4: Tangents and derivatives; Lecture 5: The derivative as a function - Differentiation Rules; Lecture 6: The derivative as a Rate of change - Derivative of Trigonometric - The Chain Rule; Lecture 7: Implicit Differentiation Related rates; Lecture 8: Extreme values of functions; Lecture 9:
The Mean value Theorem - First derivative test - Concavity Applied Optimization. L’Hospital’s Rule; Lecture 10: Antiderivatives - Sigma Notation; Lecture 11: The Definite Integral.
Contents: Vector and Space Three dimention; Vector and Geometry of Space; Vector Valued-functions and motion in Space; Functions of sereval Variables - Limits and Continuity; Partial Derivatives; Directional Derivatives - Tangent Planes; Extrem Values - Taylor’s Formula; Double Integrals; Double Integrals in Polar Form - Triple Integrals; Triple Integrals in Cylindrical and Spherical Coordinates; Green’s Theorem - Surfaces and Area;
Stokes’s Theorem - The Divergence Theorem.