Master the basics of domain, range, types of functions, and composition. Solve problems involving inverse functions and graphical representations.
Learn fundamental operations like addition, subtraction, multiplication, and transposition of matrices. Grasp determinants and their application in solving linear equation systems.
Understand first and second-order differential equations, separation of variables, and their application in real-world scenarios like motion and population growth.
Learn optimization techniques for resource allocation using concepts like feasible regions, constraints, and objective functions. Solve problems graphically or using the simplex method.
Understand vector operations like addition, subtraction, dot product, and cross product. Apply these concepts to geometry, motion, and physics-related problems.
Dive into basic probability concepts, random variables, and distributions. Solve problems related to calculating probabilities, expected values, and standard deviations.
Master inverse sine, cosine, and tangent functions. Solve trigonometric equations using these functions.