MAT 1339 Lecture Notes - Lecture 1: Differential Calculus, Linear Function

In algebra, we study linear functions such as f(x) = 3x+1. To fully understand a line we only need one point and the slope. Lines are very simple and c

MAT 1339 Lecture 2: MAT1339-Lecture2 Secant lines & Rate of change

Mat1339 lecture 2 secant lines &amp; average rate of change. Secant line: a straight line that intersects at 2 points on a function. It comes from the 

MAT 1339 Lecture Notes - Lecture 3: Indeterminate Form

You can use any point because these slopes are constant. Slope of secant lines or average rate of change: constant and rely on a,b to be determined. Sl

MAT 1339 Lecture 4: MAT1339 – Lecture 4 - Limits and Instantaneous rate of change

MAT 1339 Lecture Notes - Fall 2018 Lecture 5 - Power rule

MAT 1339 Lecture Notes - Lecture 6: Power Rule, Product Rule, Quotient Rule

Mat1339 - lecture 6 - rules of derivatives. Derivatives: the instantaneous rate of change or the slope at a certain point on the graph. They allow us t

MAT 1339 Lecture Notes - Lecture 7: Quotient Rule, Function Composition, Product Rule

MAT 1339 Lecture 8: MAT1339 - Lecture 8 - Review for Midterm

MAT 1339 Lecture Notes - Lecture 11: Maxima And Minima

MAT 1339 Lecture 12: MAT1339 - Lecture 10 - Critical points and the second derivative (1)

Mat1339 - lecture 10 - critical points and the second derivative. Non-extremal critical points: a point is not an extrema if the tangent line is horizo

MAT 1339 Lecture Notes - Lecture 13: Asymptote

MAT 1339 Lecture Notes - Lecture 16: V Engine

Mat1339 - lecture 12 - calculus problems using derivatives. How to graphically differentiate a function from its derivative: Using calculus to interpre

MAT 1339 Lecture Notes - Lecture 17: Exponential Function, Shap, Exponential Growth

MAT 1339 Lecture Notes - Lecture 18: Unit Circle

MAT 1339 Lecture Notes - Lecture 19: Chain Rule

MAT 1339 Lecture Notes - Lecture 21: Parallelogram

Mat1339 - lecture 16 - introduction to vectors. Scalar: a quantity that only represents magnitudes (sizes). Vector: a quantity that represents the magn

MAT 1339 Lecture Notes - Lecture 22: Hypotenuse, Unit Vector

MAT 1339 Lecture Notes - Lecture 23: Dot Product, Unit Vector, Right Angle

Mat1339 - lecture 18 - vectors dot product. We have learned to add, subtract and multiply scalars with vectors but what about multiplying vectors with 

MAT 1339 Lecture Notes - Lecture 24: Cartesian Coordinate System, Cross Product, Orthogonality

Mat1339 - lecture 19 - cartesian third dimension and the cross product. Cartesian third dimension: adding a third dimension to the original (x,y) carte

MAT 1339 Lecture 25: MAT1339 - Lecture 25 - Vector geometry of lines

The equation of the slope of a straight line which. Mat1339 - lecture 20 - vector geometry of lines. We have previously seen two kinds of equations of 

MAT 1339 Lecture 26: MAT1339 - Lecture 21 - Equations of lines in third space

MAT 1339 Lecture Notes - Lecture 27: Unit Circle, Cross Product, Parallelogram

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Instantaneous rate of change as a limit, derivatives of polynomials using limits, derivatives of sums, products, the chain rule, derivatives of rational, trigonometric, exponential, logarithmic, and radical functions. Applications to finding maxima and minima and graph sketching. Concavity and points of inflection, the second derivative. Optimization in models involving polynomial, rational, and exponential functions. Vectors in two and three dimensions. Cartesian, polar and geometric forms. Algebraic operations on vectors, dot product, cross product. Applications to projections, area of parallelograms, volume of parallelepipeds. Scalar and vector parametric form of equations of lines and planes in two and three dimensions. Intersections of lines and planes. Solution of up to three equations in three unknowns by elimination or substitution. Geometric interpretation of the solutions.

Introduction to Calculus and Vectors

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