Differentiation - Mathematics (Senior Secondary)

Change is constant, and differentiation measures it exactly. This course isolates differentiation to clarify the concept of instantaneous change before introducing reverse operations. You will calculate the limit of a function, differentiate explicit algebraic expressions, and handle simple trigonometrical functions. The content separates these rules to build a strong foundation in calculus without confusion. Knowing how fast things change applies directly to real problems. You use differentiation to optimise materials in engineering, predict market trends in economics, or calculate velocity in physics. Mastering the rate of change allows you to find peak efficiency or minimum waste in practical scenarios. These tools apply to any field where variables shift over time or space. You will learn to evaluate the limit of a continuous function. You will compute derivatives of standard algebraic and trigonometric equations; you will also solve applied problems involving the rate of change of a physical quantity. Furthermore, you will determine points of maxima and minima to solve optimisation problems accurately. The focus remains strictly on applying rules of differentiation to extract exact values from dynamic systems. This material targets senior secondary students preparing for university entrance examinations. It also serves university freshmen who need a clear review of fundamental calculus concepts. Anyone requiring a direct approach to the mathematics of change will gain exact methods to solve complex equations. The course provides the necessary mathematical tools to pass exams and succeed in technical disciplines.