Errors calculations: Basic concepts, types of errors, error propagation in numerical calculations. Approximate expressions functions: The coincident polynomial and polynomials of Taylor and Mc Laurin, applications in numerical problem solving methods - complete functions in non-closed form. Numerical solution of algebraic equations: Finding roots - method of regula falsi, method of Newton-Raphson. Numerical interpolation: Linear interpolation full insertion by the method of Newton. Dual linear interpolation. Numerical differentiation: Linear derivation, complete derivatization by means of coincident polynomial Newton. Numerical integration: trapezoidal method, method of Cotes. Numerical solution of first-order differential equations: The method of Euler, the method of Taylor, the method of Runge-Kutta 2nd and 4th order.

Sum and direct sum of subspaces. The polynomial rings R[t] and C[t]. Eigenvalues, eigenvectors, and eigenspaces. Diagonalization and triangulation of endomorphisms and square matrices. Minimal polynomial and the Cayley-Hamilton Theorem. Applications to linear recurrent sequences, computation of powers and inverse of a matrix. Symmetric bilinear forms and inner products. Euclidean spaces. Orthonormal bases and the Gram-Schmidt orthogonalization process. Orthogonal subspaces and orthogonal complements. Orthogonal matrices and isometries. Adjoint of an endomorphism and of a square matrix. Self-adjoint endomorphisms and symmetric matrices. The spectral theorem for self-adjoint endomorphisms (Euclidean case) and symmetric matrices. Geometric interpretation of isometries. Positive and non-negative endomorphisms. Norm of a matrix. Quadratic forms and principal axes. Classification of quadratic surfaces. Hermitian spaces. Hermitian and unitary matrices. The spectral theorem for self-adjoint endomorphisms (Hermitian case) and Hermitian matrices.

Basic introduction to agricultural experimentation. Introduction to Statistics. Descriptive Statistics. Theoretical probability distributions. Sampling distributions. Measures of dispersion. Estimation. Statistical Inference. Statistical significance tests. Hypothesis testing. Simple linear regression. Demonstrate use of statistical packages.

With the help of computer and using the statistical program SPSS, this course applies the statistical theory developed in the courses "Introduction to Statistics", "Statistical Inference" and "Regression and Analysis of Variance."