20802114 -
MATHEMATICAL ANALYSIS I
(objectives)
TO ALLOW THE ACQUISITION OF THE DEDUCTIVE-LOGIC METHOD AND PROVIDE BASIC MATHEMATICAL TOOLS FOR THE DIFFERENTIAL AND INTEGRAL CALCULUS. EACH TOPIC WILL BE STRICTLY INTRODUCED AND TREATED BY CARRYING OUT, WHENEVER NEEDED, DETAILED DEMONSTRATIONS AND BY REFERRING LARGELY TO THE PHYSICAL MEANING, THE GEOMETRICAL INTERPRETATION AND THE NUMERICAL APPLICATION. A PROPER METHODOLOGY COMBINED WITH A REASONABLE SKILL IN THE USE OF THE CONCEPTS AND RESULTS OF THE INTEGRO-DIFFERENTIAL CALCULUS, WILL ENABLE STUDENTS TO FACE MORE APPLICATIVE CONCEPTS THAT WILL BE TACKLED DURING THE SUCCEEDING COURSES.
Group:
CANALE 1
-
Derived from
20802114 ANALISI MATEMATICA I in INGEGNERIA INFORMATICA L-8 CANALE 1 TOLLI FILIPPO
( syllabus)
Numerical sets (N, Z, Q and R), R assiomatic construction of R by upper extremity, Archimede properties, Q in R density, N construction and induction principle, Newton binomial and combinatorial calculus, Inequality of Bernoulli; Topology elements in R (isolated and accumulated points, open / closed sets and characterization, closure of a set) and Bolzano-Weierstrass theorem; Complex numbers, polar representation and n-th roots of the unit; Real functions of real variable, domain, co-domain, and inverse functions; Function and property limits, monotone function limits; Succession limits, significant limits, Nepero number, bridge theorem, limsup / liminf, sequences and topology, compact sets, and characterization; Continuous functions and their properties, continuity of elementary functions, types of discontinuities and monotone functions, fundamental theorems on continuous functions (zeros, intermediate values, Weierstrass); Function and function derivative, elementary function derivatives, fundamental theorems of differential calculus (Fermat, Rolle, Cauchy, Lagrange, de Hopital, Taylor's formula), monotony and derivative sign, local degradation maxima / minima, convex functions / concave; Function graph; Integration according to Riemann and property, integrability of continuous functions, primitive elementary functions, I and II fundamental theorem of integral calculation, integration for substitution and parts, rational functions, some special replacements; Numerical series and convergence, geometric series, convergence criteria for positive terms series (comparison, asymptotic comparison, root, ratio, condensation) and for series at any time (absolute convergence, Leibnitz); Taylor series developments, developments of some elementary functions; Improper integrals.
( reference books)
A. Laforgia, Calcolo differenziale e integrale, Ed. Accademica; P. Marcellini e C. Sbordone, Esercizi di Matematica, Vol. 1, tomi 1--4, Ed. Liguori;
Group:
CANALE 2
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Derived from
20802114 ANALISI MATEMATICA I in INGEGNERIA INFORMATICA L-8 CANALE 2 NATALINI PIERPAOLO
( syllabus)
Numerical sets (N, Z, Q and R), R assiomatic construction of R by upper extremity, Archimede properties, Q in R density, N construction and induction principle, Newton binomial and combinatorial calculus, Inequality of Bernoulli; Topology elements in R (isolated and accumulated points, open / closed sets and characterization, closure of a set) and Bolzano-Weierstrass theorem; Complex numbers, polar representation and n-th roots of the unit; Real functions of real variable, domain, co-domain, and inverse functions; Function and property limits, monotone function limits; Succession limits, significant limits, Nepero number, bridge theorem, limsup / liminf, sequences and topology, compact sets, and characterization; Continuous functions and their properties, continuity of elementary functions, types of discontinuities and monotone functions, fundamental theorems on continuous functions (zeros, intermediate values, Weierstrass); Function and function derivative, elementary function derivatives, fundamental theorems of differential calculus (Fermat, Rolle, Cauchy, Lagrange, de Hopital, Taylor's formula), monotony and derivative sign, local degradation maxima / minima, convex functions / concave; Function graph; Integration according to Riemann and property, integrability of continuous functions, primitive elementary functions, I and II fundamental theorem of integral calculation, integration for substitution and parts, rational functions, some special replacements; Numerical series and convergence, geometric series, convergence criteria for positive terms series (comparison, asymptotic comparison, root, ratio, condensation) and for series at any time (absolute convergence, Leibnitz); Taylor series developments, developments of some elementary functions; Improper integrals.
( reference books)
A. Laforgia, Calcolo differenziale e integrale, Ed. Accademica; P. Marcellini e C. Sbordone, Esercizi di Matematica, Vol. 1, tomi 1--4, Ed. Liguori;
Group:
CANALE 3
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Derived from
20802114 ANALISI MATEMATICA I in INGEGNERIA INFORMATICA L-8 CANALE 3 ESPOSITO PIERPAOLO
( syllabus)
Number sets (N, Z, Q and R), axiomatic construction of R via supremum, Archimedean property, density of Q in R, construction of N in R and the inductive method, binomial formula and combinatorial calculus, real powers, the Bernoulli inequality; topological concepts in R (accumulation and isolated points, open/closed sets and characterization, closure of a set) and Bolzano-Weierstrass theorem; complex numbers, polar representation and n-roots of unity; real functions with a real variable, domain, image and inverse functions; limits for functions and properties, limits of monotone functions; limits for sequences, special limits, the Napier number, the bridge theorem, limsup/liminf, sequences and topology, compact sets and characterization; continuous functions and their properties, continuity of elementary functions, types of discontinuities and monotone functions, fundamental theorems on continuous functions (zeroes, intermediate values, Weierstrass); derivative of a function and properties, derivatives of elementary functions, the fundamental theorems of differential calculus (Fermat, Rolle, Cauchy, Lagrange, de l'Hopital, Taylor's formula), monotonicity and sign of the derivative, degenerate local maxima/minima, convex/concave functions; graph of a function; Riemann integration and properties, integrability of continuous functions, primitives for elementary functions, I and II fundamental theorems of integral calculus, change of variables and integration by parts, rational functions, some special change of variables; numerical series and convergence, geometric series, convergence criteria for positive series (comparison, asymptotic comparison, n-th root, ratio, condensation) and for general series (absolute convergence, Leibniz); Taylor series, series of some elementary functions; improper integrals.
( reference books)
"Analisi Matematica 1", M. Bramanti, C.D. Pagani, S. Salsa, editore Zanichelli "Analisi Matematica 1", C.D. Pagani, S. Salsa, editore Zanichelli "Analisi Matematica 1", E. Giusti, editore Bollati Boringhieri "Funzioni Algebriche e Trascendenti", B. Palumbo, M.C. Signorino, editore Accademica "Analisi Matematica", M. Bertsch, R. Dal Passo, L. Giacomelli, editore MCGraw-Hill "Esercizi di Analisi Matematica", S. Salsa, A. Squellati, editore Zanichelli "Esercitazioni di Matematica: vol. 1.1 e 1.2", P. Marcellini, C. Sbordone, editore Liguori "Esercizi e complementi di Analisi Matematica: vol. 1", E. Giusti, editore Bollati Boringhieri
Group:
CANALE 4
-
Derived from
20802114 ANALISI MATEMATICA I in INGEGNERIA INFORMATICA L-8 CANALE 4 LAFORGIA ANDREA IVO ANTONIO
( syllabus)
Numerical sets (N, Z, Q and R), R assiomatic construction of R by upper extremity, Archimede properties, Q in R density, N construction and induction principle, Newton binomial and combinatorial calculus, Inequality of Bernoulli; Topology elements in R (isolated and accumulated points, open / closed sets and characterization, closure of a set) and Bolzano-Weierstrass theorem; Complex numbers, polar representation and n-th roots of the unit; Real functions of real variable, domain, co-domain, and inverse functions; Function and property limits, monotone function limits; Succession limits, significant limits, Nepero number, bridge theorem, limsup / liminf, sequences and topology, compact sets, and characterization; Continuous functions and their properties, continuity of elementary functions, types of discontinuities and monotone functions, fundamental theorems on continuous functions (zeros, intermediate values, Weierstrass); Function and function derivative, elementary function derivatives, fundamental theorems of differential calculus (Fermat, Rolle, Cauchy, Lagrange, de Hopital, Taylor's formula), monotony and derivative sign, local degradation maxima / minima, convex functions / concave; Function graph; Integration according to Riemann and property, integrability of continuous functions, primitive elementary functions, I and II fundamental theorem of integral calculation, integration for substitution and parts, rational functions, some special replacements; Numerical series and convergence, geometric series, convergence criteria for positive terms series (comparison, asymptotic comparison, root, ratio, condensation) and for series at any time (absolute convergence, Leibnitz); Taylor series developments, developments of some elementary functions; Improper integrals.
( reference books)
A. Laforgia, Calcolo differenziale e integrale, Ed. Accademica; P. Marcellini e C. Sbordone, Esercizi di Matematica, Vol. 1, tomi 1--4, Ed. Liguori;
Group:
CANALE 5
-
Derived from
20802114 ANALISI MATEMATICA I in INGEGNERIA INFORMATICA L-8 CANALE 5 TOLLI FILIPPO
( syllabus)
Numerical sets (N, Z, Q and R), R assiomatic construction of R by upper extremity, Archimede properties, Q in R density, N construction and induction principle, Newton binomial and combinatorial calculus, Inequality of Bernoulli; Topology elements in R (isolated and accumulated points, open / closed sets and characterization, closure of a set) and Bolzano-Weierstrass theorem; Complex numbers, polar representation and n-th roots of the unit; Real functions of real variable, domain, co-domain, and inverse functions; Function and property limits, monotone function limits; Succession limits, significant limits, Nepero number, bridge theorem, limsup / liminf, sequences and topology, compact sets, and characterization; Continuous functions and their properties, continuity of elementary functions, types of discontinuities and monotone functions, fundamental theorems on continuous functions (zeros, intermediate values, Weierstrass); Function and function derivative, elementary function derivatives, fundamental theorems of differential calculus (Fermat, Rolle, Cauchy, Lagrange, de Hopital, Taylor's formula), monotony and derivative sign, local degradation maxima / minima, convex functions / concave; Function graph; Integration according to Riemann and property, integrability of continuous functions, primitive elementary functions, I and II fundamental theorem of integral calculation, integration for substitution and parts, rational functions, some special replacements; Numerical series and convergence, geometric series, convergence criteria for positive terms series (comparison, asymptotic comparison, root, ratio, condensation) and for series at any time (absolute convergence, Leibnitz); Taylor series developments, developments of some elementary functions; Improper integrals.
( reference books)
A. Laforgia, Calcolo differenziale e integrale, Ed. Accademica; P. Marcellini e C. Sbordone, Esercizi di Matematica, Vol. 1, tomi 1--4, Ed. Liguori;
Group:
CANALE 6
-
Derived from
20802114 ANALISI MATEMATICA I in INGEGNERIA INFORMATICA L-8 CANALE 6 NATALINI PIERPAOLO
( syllabus)
Numerical sets (N, Z, Q and R), R assiomatic construction of R by upper extremity, Archimede properties, Q in R density, N construction and induction principle, Newton binomial and combinatorial calculus, Inequality of Bernoulli; Topology elements in R (isolated and accumulated points, open / closed sets and characterization, closure of a set) and Bolzano-Weierstrass theorem; Complex numbers, polar representation and n-th roots of the unit; Real functions of real variable, domain, co-domain, and inverse functions; Function and property limits, monotone function limits; Succession limits, significant limits, Nepero number, bridge theorem, limsup / liminf, sequences and topology, compact sets, and characterization; Continuous functions and their properties, continuity of elementary functions, types of discontinuities and monotone functions, fundamental theorems on continuous functions (zeros, intermediate values, Weierstrass); Function and function derivative, elementary function derivatives, fundamental theorems of differential calculus (Fermat, Rolle, Cauchy, Lagrange, de Hopital, Taylor's formula), monotony and derivative sign, local degradation maxima / minima, convex functions / concave; Function graph; Integration according to Riemann and property, integrability of continuous functions, primitive elementary functions, I and II fundamental theorem of integral calculation, integration for substitution and parts, rational functions, some special replacements; Numerical series and convergence, geometric series, convergence criteria for positive terms series (comparison, asymptotic comparison, root, ratio, condensation) and for series at any time (absolute convergence, Leibnitz); Taylor series developments, developments of some elementary functions; Improper integrals.
( reference books)
A. Laforgia, Calcolo differenziale e integrale, Ed. Accademica; P. Marcellini e C. Sbordone, Esercizi di Matematica, Vol. 1, tomi 1--4, Ed. Liguori;
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12
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MAT/05
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108
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-
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-
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Basic compulsory activities
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ITA |
Optional group:
comune Orientamento unico A SCELTA DELLO STUDENTE ING CIVILE - (show)
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12
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20801616 -
APPLIED GEOLOGY
(objectives)
IT PRESENTS AN OVERVIEW OF EARTH SCIENCES, ILLUSTRATING THE BASIC CONCEPTS OF GEOLOGY: THE FORM, MATERIALS, INTERNAL DYNAMICS, GEOLOGICAL CYCLES. IT PROVIDES THE BASIC TOOLS FOR READING AND INTERPRETATION OF GEOLOGICAL MAPS AT DIFFERENT SCALES. IT PROVIDES THE SKILLS NECESSARY TO INTERPRET THE GEOLOGICAL SURVEY. IT PROVIDES INFORMATION RELATING TO NATURAL HAZARDS, NATURAL RESOURCES AND ENVIRONMENTAL IMPACT
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Derived from
20801616 GEOLOGIA APPLICATA in INGEGNERIA CIVILE L-7 N0 MAZZA ROBERTO
( syllabus)
The course program includes the presentation and discussion of the following topics: Introduction to Geology: the uniqueness of planet Earth; aspects of geology, the Earth's crust - the processes affecting the surface (the model of the Earth's relief, the sedimentary processes, sedimentary rocks), the body of the Earth - the internal process (the interior of the Earth, the earthquakes, volcanic phenomena, igneous rocks, metamorphic rocks; lithogenetic cycle, plate tectonics) deformation of the crust (lithological succession, the deformation of rocks, the geometry of geological bodies ). The "craft" of the geologist: the geological survey (preliminary research, materials and methods, analysis and interpretation of geological maps, reading and interpretation of thematic maps), the geological-technical survey (principal physical and mechanical properties of earth and rocks, the geological exploration of subsoil). Engineering Geology: Slope instabilities; hydrogeology; study of the geological context related to planning issues (the geological hazard); first intervention on the territory; redevelopment (urban geology.)
( reference books)
JOHN P. GROTZINGER, THOMAS H. JORDAN – Capire la Terra – Edizione italiana a cura di Elvidio Lupia Palmieri e Maurizio Parotto – Zanichelli, Bologna LAURA SCESI, MONICA PAPINI, PAOLA GATTINONI – Principi di Geologia applicata – Casa Editrice Ambrosiana, Milano VARIOUS MATERIAL PROVIDED BY THE TEACHER
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6
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GEO/05
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54
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-
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-
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-
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Elective activities
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ITA |
20801617 -
MATERIALS FOR CIVIL ENGINEERING
(objectives)
THE AIM OF THE CLASS IS TO ACQUIRE THE KNOWLEDGE OF THE MATERIALS USED IN CIVIL ENGINEERING, TO PERFORM TESTS ON MATERIALS AND TO COMPREHEND THE ENVIRONMENTAL IMPACT FROM THEIR USE.
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LANZARA GIULIA
( syllabus)
Introduction to Material Science and Technologies, snap-shots of continuum mechanics, Atomic bonds, Dislocations, Mechanical behavior of materials, Fracture, Materials for Civil Engineering (metals, polymers, concrete, composites, wood), Standards, An overview of new materials for Civil Engineering and of the new frontiers (intelligent materials, self-healing materials, nanocomposites etc.), Laboratory experience (Multifunctional Materials Laboratory)
( reference books)
lectures given during the course
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6
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ING-IND/22
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54
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-
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-
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-
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Elective activities
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ITA |
20801621 -
ENVIRONMENTAL HEALTH ENGINEERING
(objectives)
TEACHING MAKES THE GENERAL TERMS, EVEN IN RELATION TO REGIONAL AND NATIONAL LEGISLATION ON WASTE MANAGEMENT (COLLECTION, TREATMENT AND DISPOSAL) AND RECLAMATION OF CONTAMINATED SITES.
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FRANCO LEOPOLDO
( syllabus)
• Chemestry and biology principles • Ecology • Water environment: water quality, water pollution, potabilization plants, waste water, waste water treatments. • Air pollution: pollutants and system for emission treatment • Solid waste: integrated waste management system, waste characteristics, collection systems, recovery operations, reuse and recycling, final disposal in a controlled landfill. • Reclamation of contaminated sites • Reference national laws (D.Lgs. 152/2006)
( reference books)
Ingegneria sanitaria-ambientale, Carlo Collivignarelli, Giorgio Bertanza, Città studi edizioni, 2012
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6
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ICAR/03
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54
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-
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-
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-
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Elective activities
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ITA |
20801626 -
DESIGN
(objectives)
Transfer knowledge about theories, norms, methods and tools for analysis and planning of the city and the territory. Interpretation and analysis of urban models, for the design of general and implementing urban plans. The European directives for the sustainable redevelopment of the territories The course has the following objectives: to transfer the principles of the urban planning; disseminate knowledge of complex city and territory systems; indicate the techniques to interpret, plan, design, govern the city and the territory; indicate the main urban planning and design tools for the protection and sustainable development of the territory.
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Derived from
20801626 DISEGNO in INGEGNERIA CIVILE L-7 N0 NIMIS FRANCESCO MARIA
( syllabus)
"Drawing" for designers is the equivalent of the score for musicians: a set of encoded and scientific signs enabling the design and the accurate realization of the work. This course aims to provide capabilities and tools to future engineers in order to design and devise their projects by means of the "notation" of technical drawing. After an early phase introducing the general issues of traditional or “analogical” drawing, the course will continue using digital technology, specifically CAD systems. The representation of civil engineering project in its various phases (survey, analysis, design, implementation, etc.) poses nontrivial problems especially when realized in numeric environment. The several features of a project match different sets of data that, according to the given requirements, coexist differently in the digital space. These data can be separately, jointly or selectively managed depending on the need. These informations are processed not in a static and linear way but in a dynamic and multi polar one. Therefore it is mandatory to develop a clear vision of the digital technique leading to a correct method, overcoming the empirical improvisation of neophytes and self-taught people. The purpose of this course is to provide students with a proper "Philosophy of use" of drawing and its related computational tools, in order to rationally and properly handle all the digital processes related to the project and its representation. It is mandatory to sign up for the course within the first 3 lessons and warmly suggested to attend lessons. There will be some intermediate test before the final one which shall not be done without the positive results of the previous.
( reference books)
Rudy Rucker
"La quarta dimensione - un viaggio guidato negli universi di ordine superiore"
Adelphi 1994
---------------
Francesco Maria Nimis:
1- "Informazioni_raster_in_ambiente_CAD"
2- "Gestione_immagini_raster"
both in http://host.uniroma3.it/docenti/nimis/
On-line course papers (in italian only)
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6
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ICAR/17
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48
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-
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-
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-
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Elective activities
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ITA |
20801979 -
GEOMATICS
(objectives)
FORMATIVE AIMS TO PROVIDE BASIC KNOWLEDGE ON MAJOR THEORETICAL, METHODOLOGICAL AND OPERATIONAL ISSUES INVOLVED IN SURVEYING, SO THAT THE STUDENT CAN ACQUIRE THE NECESSARY SKILLS TO DESIGN AND PERFORM A SURVEY AND TO PROCESS THE DATA RELATED TO IT. WE DISCUSS THE BASIC PRINCIPLES OF GEODESY AND CARTOGRAPHY, THE PRINCIPLES OF SURVEYING AND THE QUANTITIES THAT CAN BE MEASURED WITH THE TOPOGRAPHICAL INSTRUMENTS, BOTH TERRESTRIAL AND SATELLITE, THE SURVEY METHODS AND THE TREATMENT OF OBSERVATIONS.
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Derived from
20801979 GEOMATICA in INGEGNERIA CIVILE L-7 N0 FIANI MARGHERITA
( syllabus)
GEOMATICA course program – prof. Margherita Fiani
Introduction: Principles of survey. Definitions. Measurement and their units. Precision and accuracy in surveying. Geodesy: Shape of the Earth. Earth gravity field. Equipotential surfaces. Geoid. Definition of height. Reference ellipsoid. Geoid undulations. Coordinate systems: natural, geocentric, ellipsoidal. Geometry of the ellipsoid of rotation. Normal sections. Principal curvatures. Geodesic. Reference surfaces used to approximate the ellipsoid. Geodetic networks and Datums. Horizontal and vertical Datum. Datums used in Italy. Geodetic, astronomical, cartesian geocentric, cartesian local coordinates. Coordinate transformations. Transformations between Datums. Practical geodetic problems. Theory of errors and statistical treatment of observations: Types of measurement errors: gross, systematic and random. Probability distributions. Normal (Gaussian) distribution. Estimation of characteristic parameters of a distribution. Confidence intervals. Standardized variables. Two-dimensional continuous random variables. Covariance and correlation coefficient. Propagation of variance-covariance. Applications to surveying problems. Method of least squares. Adjustment with the method of indirect observations. Cartographic representations: The problem of map projections. Deformation modules. Analytical approach to map projections. Classification of map projections. Conformal projections. The conformal Gauss map and its geodetic use. Contracted coordinates and modules expressions. The Italian official cartography. Coordinates measurement on the map of Italy at the scale of 1:25000. The UTM-UPS mapping system. Surveying: National geodetic networks: planimetric, leveling, IGM95 networks. Reference, thickening and local networks. Planimetric survey, reduction of distances to the reference surface. Main surveying schemes: triangulation, intersection and radiation methods, open and closed traverses, detailed survey. Vertical survey: orthometric and normal heights, reference surfaces. Trigonometric and geometric leveling: scheme, instrumentation, accuracy. Practical aspects of GPS surveying, sessions and independent baselines, baselines computation, transformation in the national reference system. Design, planning, materialization, surveying and adjustment of planimetric, leveling and GPS networks. Instrumentation and operational methods: Measure of angles. Theodolites. Main components: telescope, vertical and horizontal circles, circle reading and optical micrometer, optical plumb. Setting up. Reading method of azimuth angles. Bessel’s method. Zenith angles. Electronic theodolites. Measure of distances. Geodimeters: operating principle, fundamental equation, accuracy of a geodimeter. Total stations. Leveling. Levels, types of levels, main components: telescope, level plumbs, leveling screws. Bessel’s method. Invar stadia. GPS: basic concepts, GPS constellation and control segment. GPS signal structure. GPS biases and errors. GPS receivers. WGS84. Pseudo-range and carrier phase measurements. GPS modernization. Other GNSS systems.
( reference books)
GEOMATICA course program – prof.ssa Margherita Fiani
Support material: Lecture notes from the course teacher Additional texts: G. Inghilleri, L. Solaini. Topografia. Levrotto & Bella, 1997. G. Folloni. Principi di Topografia – Patron, 1982 G. Bezoari, C. Monti, A. Selvini. Topografia Generale. UTET, Milano, 2002 B. Hofmann-Wellenhof, H. Lichtenegger, J. Collins. Global Positioning System: theory and practice. Springer-Verlag, 1997.
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6
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ICAR/06
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48
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-
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-
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-
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Elective activities
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ITA |
20810070 -
SUSTAINABILITY AND ENVIRONMENTAL IMPACT
(objectives)
TO PROVIDE STUDENTS WITH KNOWLEDGE ON ENVIRONMENTAL IMPACTS OF HUMAN ACTIVITIES, TO CLASSIFY THE IMPACTS, TO ILLUSTRATE THE CONCEPT OF SUSTAINABILITY, TO DESCRIBE THE EVALUATION PROCEDURES OF ENVIRONMENTAL IMPACT AND ENVIRONMENTAL CERTIFICATION PROTOCOLS. ILLUSTRATE , THROUGH SIGNIFICANT CASE STUDIES, EXAMPLES OF ENVIRONMENTAL IMPACT ASSESSMENT AND OF IMPACTS MITIGATION.
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Derived from
20810070 SOSTENIBILITA' E IMPATTO AMBIENTALE in INGEGNERIA ELETTRONICA PER L'INDUSTRIA E L'INNOVAZIONE LM-29 ASDRUBALI FRANCESCO
( syllabus)
Interdisciplinary characters of energy problems. Definition of the quantities and energy indices. Consumption, reserves and forecasts: the world's energy market, the Italian energy situation. Sustainable Development The international conference on climate and the environment: the Kyoto Protocol, the post-Kyoto, COP 21. The EU directives on energy, environment and climate. Sustainable development: definition, tools and methods. The Aalborg Chart, the Agenda 21 processes, the Covenant of Mayors. Environmental pollution environmental impact of energy systems, production and transport infrastructure. Air pollution: sources, pollutants, legislation, techniques for emissions control. The global pollution: acid rains, ozone depletion, greenhouse effect. Other forms of pollution: thermal pollution, noise, electromagnetic pollution environmental impact assessments The environmental impact assessment: legislation, procedures, methodologies, content and stages., Strategic Environmental Assessment. environmental footprint environmental footprint assessment procedures: Life Cycle Assessment; Social Life Cycle Assessment. Carbon Footprint and Water Footprint. environmental certification protocols environmental certification of productions: ISO 14000, EMAS, ecolabel. environmental sustainability protocols of buildings: LEED; BREEAM; ITHACA. Protocols of sustainability of University certification: Green Metric The Green Economy Definitions, areas of intervention, the Green Economy Manifesto. Outlines of incentive mechanisms in the Green Economy. Costs / benefits analysis. Applications and case studies Examples of environmental impact assessments and good sustainability practices.
( reference books)
Power point presentations will be made available in the Rome Tre Moodle system, as well as a list of suggested books
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6
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ING-IND/11
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48
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Elective activities
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ITA |
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