The course aims to provide knowledge and techniques of linear algebra in real and complex vector spaces.
Course contents summary
Field of complex numbers: trigonometric and exponential form. Vector and matrix calculus. Real and complex vector spaces. Linear applications and associated matrices. Eigenvalues and eigenvectors. Bilinear forms and scalar products. Hermitian Products.
Marco Abate "Geometria" MacGraw-Hill
Privileged education mode is the frontal lesson that offered arguments from a formal point of view, accompanied by significant examples, applications and exercises.
Assessment methods and criteria
Verfication of learning takes place through a written test and an oral. In the written examination through the exercises proposed by the student must demonstrate that they possess the basic knowledge of linear algebra and analytical geometry. In the oral examination the student must be able to conduct its own demonstrations relating to the themes of the course using an appropriate language and mthemathical formalism.