1. BASIC NOTIONS
1.1 The remarkable products
1.2 First and second degree equations and inequalities
1.3 The powers
1.4 The exponential function
1.5 The logarithmic function
1.6 Trigoniometry: the function sen (x), cos (x) and tan (x)
2. THE SETS
2.1 Numerical sets - The class of Real numbers - Natural, Relative, Rational and Irrational numbers
3. THE FUNCTION STUDY
3.1 Definition and meaning of function
3.2 The field of existence
3.3 The study of the sign (positivity of the function)
3.4 Limits and continuity of the function
3.5 Theorems on derivable functions - Rolle's theorem - Lagrange's theorem - Cauchy's theorem 3.6 The derivative and the search for the maxims and minima of the function
3.7 Resolution models of a function
4. THE INTEGRALS
4.1 Meaning of integral
4.2 Integral of Cauchy
4.3 Integral of Reimann
4.4 Definite integral
4.5 Undefined Integral
4.6 Theorems on integrals
4.7 Integration by substitution
4.8 Integration by parts
4.9 Table of immediate integrals
