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Mathematics I

Code: LTAM01     Sigla: MAT I

Áreas Científicas
Classificação Área Científica
OFICIAL Matemática

Ocorrência: 2022/2023 - 1S

Ativa? Yes
Página Web: https://moodle.ips.pt/2223/
Unidade Responsável: Departamento de Matemática
Curso/CE Responsável: Environmental and Marine Technology

Ciclos de Estudo/Cursos

Sigla Nº de Estudantes Plano de Estudos Anos Curriculares Créditos UCN Créditos ECTS Horas de Contacto Horas Totais
LTAM 89 Plano de Estudos 2016/17 1 - 6 75 162

Docência - Responsabilidades

Docente Responsabilidade
Patrícia Santos Ribeiro

Docência - Horas

Theorethical and Practical : 3,00
Practical and Laboratory: 2,00
Type Docente Turmas Horas
Theorethical and Practical Totais 2 6,00
Ana Isabel Celestino de Matos 3,00
Anabela das Neves Pereira 3,00
Practical and Laboratory Totais 3 6,00
Ana Teresa Agostinho Barros dos Santos 2,00
Ricardo José de Oliveira Issa 4,00

Língua de trabalho

Portuguese
Obs.: Português

Objetivos

The aim of the Mathematics I curricular unit is to provide students the basic mathematical knowledge referred to in the syllabus of the curricular unit and necessary for their training as Higher Technicians or Engineers.

Resultados de aprendizagem e competências

In each topic, students must acquire the following learning outcomes:



  1. Identify the properties of real variable real functions, interpret the limit concept and compute function limits.



  2. Analyze the continuity of a function and apply the Bolzano and Weierstrass theorems.



  3. Characterize the inverse of a trigonometric function.



  4. Interpret the concept of derivative and compute the derivative of a function at a point by definition.



  5. Analyze the differentiability of a function on an open interval and apply the rules of derivation, Rolle, Lagrange and Cauchy theorems.



  6. Apply the Taylor formula of a function at a point.



  7. Recognize and determine antiderivatives.



  8. Integration by parts, by substitution and integration of rational functions.



  9. Understand the Riemann integral and apply the fundamental theorem of integral calculus.



  10. Compute definite integrals using Barrow's formula.



  11. Calculate areas and volumns using definite integrals.



  12. Calculate improper integrals with unbounded endpoints and with unbounded functions.


Modo de trabalho

Presencial

Pré-requisitos (conhecimentos prévios) e co-requisitos (conhecimentos simultâneos)

Mathematics of Secondary School.

Programa


  1. Real functions of one real variable


    1. Basic notions.

    2. Limits; one-sides limits; properties.

    3. Continuous functions, properties, continuous extension.

    4. Intermediate-Value, Extreme-Value and inverse function theorem.

    5. Inverse trigonometric functions.


  2. Differential calculus in ℝ


    1. Derivative and its interpretations; tangent and normal lines to a graph.

    2. Differentiable function, properties; differentiation rules; chain rule and inverse function theorem; derivatives of inverse trigonometric functions.

    3. Fundamental theorems: Rolle’s, Mean-Value and Cauchy’s Mean-Value theorem; Hospital’s rule.

    4. Higher-order derivatives; Taylor’s and Maclaurin’s formulas (Lagrange’s remainder). Monotony, local extrema, concavities.


  3. Integral calculus in ℝ


    1. Antiderivatives; properties. Methods of integration: by parts, by substitution, of rational functions.

    2. Riemann integral; properties. Indefinite integral; properties.

    3. Fundamental Theorem of Calculus, Barrow’s formula.

    4. Integration by parts and by substitution.

    5. Areas and volumns of solids of revolution.

    6. Improper integrals.


Bibliografia Obrigatória

DMAT; Apontamentos editados pelo Departamento de Matemática (Available in Moodle)
Stewart, J.; Calculus: Early Transcendentals– Ninth Edition, Cengage Learning, Inc., 2016 (online)

Bibliografia Complementar

Larson, R. E., Hostetler, R. P., Edwards, B. H.; Cálculo, Vol. I - 8ª edição, McGraw Hill, 2006
Demidovitch, B.; Problemas e Exercícios de Análise Matemática, Escolar Editora, 2010

Métodos de ensino e atividades de aprendizagem

The Curricular Unit (CU) Mathematics I has a teaching load of 5 hours per week distributed over 3 hours of theoretical-practical class (TP) and 2 hours of practical-laboratory class (PL). In the current context, it is expected that all classes will be carried out in person.

In TP classes, the fundamental concepts of the different topics of the syllabus will be presented and the main results demonstrated. Exercises that illustrate the topics covered are also solved. In this type of classes, students should acquire an overview of the themes and their interconnections, accompanied by a correct and objective formulation of mathematical definitions, the precise enunciation of propositions and the practice of deductive reasoning.

In PL classes, students will carry out, under the guidance of the teacher, a set of exercises, with a view to a deeper understanding of the topics covered and a greater consolidation of knowledge.

It will be up to the student, a posteriori, to carry out an autonomous study on the topics covered and deepen their knowledge, using the study material recommended in the CU bibliography and the support of the CU teachers in the respective office hours.

The CU will have all the information and specific materials (slides where the contents of the CU are displayed, exercise sheets and suggestions for videos that address the different topics of the syllabus), in the Moodle platform. To consolidating knowledge, students will be able to take 3 formative multiple-choice tests on this platform.

 

Tipo de avaliação

Distributed evaluation with final exam

Componentes de Avaliação

Designation Peso (%)
Teste 100,00
Total: 100,00

Componentes de Ocupação

Designation Tempo (Horas)
Estudo autónomo 87,00
Frequência das aulas 75,00
Total: 162,00

Obtenção de frequência

If there is no indication to the contrary by the competent bodies, the tests and exams will be in person. If this is not possible, these assessments will be carried out online and the assessment rules and the procedures will be updated and timely disclosed on the CU page in Moodle.

The achievement of Mathematics I can be obtained through two processes of assessment in person: Continuous Assessment and Assessment by Exam.

Continuous evaluation

Continuous assessment is based on two tests (with grades rounded to the nearest tenth). The conditions for passing the continuous assessment are as follows:



  1. If the average (rounded to the units) of the test classifications is greater than or equal to 10 and less than 18, the student is approved with a final grade equal to that average, provided that in any of the tests the grade has been greater than or equal to 7.5 points;

  2. If the average (rounded to the units) of the test classifications is greater than or equal to 18, the student will have to take an oral exam, the final grade being the average of these two grades. If you do not attend the oral exam, the final classification will be 17 points.


Recovery of one of the tests
The realization of the recovery of one of the tests is conditioned to the confirmation of its viability, given the spacing between the date of the 2nd test and the date of the exam of normal season.
The conditions for its realization will be as follows:

• a student who has a grade greater than or equal to 7.5 in both tests, but an average lower than 10 values, has the option to perform the recovery of one of the tests, on the same day and time as the 1st season exam;

• a student who has a grade lower than 7.5 in one of the tests, has not been able to take it or has given up, will only be able to perform the recovery of that test, on the same day and time of the 1st season exam, as long as the other test has a grade greater than or equal to 7.5;

• Successful students cannot take a test recovery with a view to improving their grade.

Exam assessment
The assessment based on the completion of an exam will follow the usual rules, that is, students who choose not to perform continuous assessment, or who, having opted for it, have not been approved, may attend the regular exam periods.

The approval conditions are as follows:



  1. If the exam grade (rounded to the units) is greater than or equal to 10 and less than 18, the student is approved with a final grade equal to the exam grade (rounded to the units).

  2. If the exam grade (rounded to the units) is greater than or equal to 18, the student will have to take an oral exam, obtaining as a final grade the average of the marks of the referred oral exam and the exam. If you do not attend the oral exam, the final classification will be 17 points.


Observations:

The tests last 2 hours and the exams 2 hours and 30 minutes, being rated on a scale from 0 to 20.

Fórmula de cálculo da classificação final

Continuous Evaluation

Let T1 and T2 be the test classifications rounded to tenths and CF=0.5T1x0.5T2 (rounded to units).



  1. If the average (rounded to the units) of the test classifications is greater than or equal to 10 and less than 18, the student is approved with a final grade equal to that average, provided that in any of the tests the grade has been greater than or equal to 7.5 points.

  2. If the average (rounded to the units) of the test classifications is greater than or equal to 18, the student will have to take an oral exam, the final grade being the average of these two grades. If you do not attend the oral exam, the final classification will be 17 points.


Exam Assessment



  1. If the exam grade (rounded to the units) is greater than or equal to 10 and less than 18, the student is approved with a final grade equal to the exam grade (rounded to the units).

  2. If the exam grade (rounded to the units) is greater than or equal to 18, the student will have to take an oral exam, obtaining as a final grade the average of the marks of the referred oral exam and the exam. If you do not attend the oral exam, the final classification will be 17 points.


Avaliação especial (TE, DA, ...)

Students with special rights referred to in the Regulation of Academic Activities and Guidelines for Assessment and School Performance of IPS Students must, by the second week of the beginning of the semester, contact the person responsible for the curricular unit, via email at patricia.ribeiro@estsetubal .ips.pt, to present their relevant specificities, under the terms provided for in the respective diplomas, otherwise they cannot be executed due to lack of objective conditions.

Melhoria de classificação

According to Article 11 of the Regulation of Academic Activities and Guidelines for the Assessment of Academic Performance of IPS Students, the improvement of classification may occur in the academic year of enrollment, at the time of appeal, or in the academic year following the of approval, in any period of assessment by examination, with the exception of the special period.

Observações


  1. Rules for conducting assessment tests/exams:


    1. For tests and exams, the student must register in Moodle in time. Students will be informed of deadlines and all information is published in Moodle.

    2. Students must take the tests/exams in their own IPS notebooks, for which they must first acquire a notebook from reprography (with 1 cover and 4 continuation sheets).

    3. A form is provided for consultation during the tests and will be made available in Moodle in advance.

    4. During the assessment tests/exams, the presentation of an oficial identification document with a photograph will be mandatory.

    5. Leaving the room can only take place one hour after the start of the test and will imply the final delivery of the test. In the case of exams, leaving the room is only allowed after an hour and a half from the beginning of the exam and will imply the final delivery of the exam.

    6. Exams or questions written in pencil are not accepted, only blue or black pen.

    7. It is not allowed to use a corrector pen in tests/exams.

    8. The handling or display of mobile phones, or any other means of remote communication, during the test is not allowed, which is sufficient reason for the cancellation of the assessment test, regardless of whether they were used.

    9. The use of calculators is not allowed.

    10. The rules for conducting remote assessments, if necessary, will be published in time.

    11. In case of suspicion of fraud or other circumstance that leads to the need to confirm the knowledge evidenced in the resolution of a test, the student may be called to a face-to-face session, which will focus only on this knowledge. If the student does not attend this session, without due justification, the test will be considered invalid.

    12. According to the IPS rules, whenever there is a situation of proven fraud in assessment tests carried out in person or at a distance in this UC, it will be canceled, and the student will be subject to the application of the Disciplinary Regulation for Students of the IPS.


  2. Office hours will be published in Moodle.

  3. Communication with students is made exclusively to the institutional address (@estudantes.ips.pt). It is up to the student to consult their area in the information system, on the course page in Moodle, as well as to manage and periodically consult their email account in the IPS domain, using it to communicate with the IPS services.

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