N.Negrello I.T.I. Malignani - Udine

Slides:

Advertisements

Similar presentations

Cognitive Academic Language Learning Approach

Advertisements

N.Negrello I.T.I. Malignani - Udine. Module: Integration Where: 5^ class I.T.I. A.Malignani Udine Time: 3 hours a week in the first term Topics of the.

English and ELT Methodology and Pedagogy Courses 2005 Some guidelines.

An ESL Learner in Transition University of Sydney 4 November 2013.

C. Paganin I.T.I. Malignani - Udine Introduction to functions For students of a third class.

J.E.W.E.L : P4s Just Excited With English Language 21 January 2011 RVPS.

D.A Public School (O & A Levels)

As a result of activities in grades 9-12, all students should develop: abilities necessary to do scientific inquiry. understandings about science inquiry.

INTRODUCTION.- PROGRAM EVALUATION

~ Science for Life not for Grades!. Why choose Cambridge IGCSE Co-ordinated Sciences ? IGCSE Co-ordinated Sciences gives you the opportunity to study.

The Skills series. A new six-level skills-centered English course for young adults and adults based on the highly successful, award-winning Skills in.

Welcome Year 6 Maths. Aims 1.Improve understanding of Maths at KS2 and give you ideas of how you can help your child. 2.Improve children’s knowledge and.

Formal Definition of Antiderivative and Indefinite Integral Lesson 5-3.

2 nd Grade Number Sense 3.3 (3Q) Know the multiplication tables of 2s, 5s, and 10s (to “times 10”) and commit them to memory. Lesson to be used by EDI-trained.

DataWORKS Educational Research (800) ©2012 All rights reserved. Comments? 6 th Grade Number Sense.

COMENIUS “LINK” PROJECT PORTUGAL PORTUGAL APRIL APRIL 2007.

What is CLIL? How does CLIL benefit learners?

6.2 Integration by Substitution & Separable Differential Equations.

Cognitive Academic Language Learning Approach TEACHER GUSTAVO GÓMEZ.

Academic vocabulary

Key Stage 3 National Strategy Foundation Subjects MFL: optional module 4.

Reading in the Content Area Goals Teacher and Student Editions Additional Resources Science Academic Plan Explore Science Materials.

A BLAST FROM THE PAST ESSENTIAL ELEMENTS OF INSTRUCTION.

INDEFINITE INTEGRALS Indefinite Integral Note1:is traditionally used for an antiderivative of is called an indefinite integral Note2: Example:

Do Now - #4 on p.328 Evaluate: Integration by parts: Now, use substitution to evaluate the new integral.

Integration Copyright © Cengage Learning. All rights reserved.

SIOP: Sheltered Instruction Observation Protocol Dr. Kelly Bikle Winter 2007.

Failing to plan .. is planning to fail

Secondary Curriculum, Instruction & EL SERVICES Explicit Direct instruction Orientation Phase October 2011.

Integrating Language Development in the Content Areas Kris Nicholls, Ph.D. Director, CABE Professional Development Services.

Integration 4 Copyright © Cengage Learning. All rights reserved.

CLIL CONTENT AND LANGUAGE INTEGRATED LEARNING ANGLOLANG 1.

Logarithmic Functions. Examples Properties Examples.

Differentiate:What rule are you using?. Aims: To learn results of trig differentials for cos x, sin x & tan x. To be able to solve trig differentials.

Unit3 Lesson Planning. Mini Teaching Why is lesson planning necessary? Principles for good lesson planning Macro planning vs. micro planning Components.

Learning Language for Language Teaching a.a – 2016 Semester 1 Lesson 2 8/10/15.

NUMICON WORKSHOP. Why do so many children find maths hard when they succeed in other subjects? We often underestimate the difficulties children have understanding.

Communicative Language Teaching (CLT)

CLIL: Methodology and Applications Team work: Mazzarelli Gioconda, Plenzick Angelina, Vaccarella Lucia, Vertucci Italia. Liceo Scientifico G. Rummo – BN.

MATHS LESSON PLAN Equations and identity Teacher : Lucia Visciano ICS ‘Giampietro Romano’ – Torre del Greco.

Calculate the perimeter A maths lesson for primary school corso CLIL c/o istituto Galvani – Giugliano corsista: Carmela Ruggiero.

Open Math Module 3 Module 3: Approaches to Integrating OER into Math Instruction Planning Instruction with OER 1.0 Introduction.

LEARNING STYLES & STRATEGIES Presented by: Sidra Javed.

What is feedback?. Giving feedback “ module 17” By: Rana Rihan Submitted to: Dr Suzan Arafat.

Antiderivatives.

INTEGRATION & TECHNIQUES OF INTEGRATION

TTC COURSES AT EF CAMBRIDGE. TTC COURSES AT EF CAMBRIDGE.

Content and language integrated learning (CLIL)

ASSESSING UNDERGRADUATES THROUGH PRESENTATIONS

Welcome Opening Prayer

Lương Quỳnh Trang- Nguyễn Thị Lan Hường

Integration by Substitution

Prepared by: Toni Joy Thurs Atayoc, RMT

Calculus for ENGR2130 Lesson 2 Anti-Derivative or Integration

Vocabulary Review Topic.

4.5 Integration by Substitution The chain rule allows us to differentiate a wide variety of functions, but we are able to find antiderivatives for.

Advanced Placement Calculus BC March 28-29, 2018 Mrs. Agnew

MATH 2413 Summer – 4:30 M - F Room 216 Professor Thomas Jay.

Sec 5.5: THE SUBSTITUTION RULE

Teaching Resource – Module 2 Presentation & Simulation Integration

§ 4.6 Properties of the Natural Logarithm Function.

Antiderivatives and Indefinite Integration

Introduction to functions

Tutorial session what is it?

A.Rotolo I.T.I. Malignani - Udine

CLIL METHODOLOGY II ALBACETE MAY 2017.

CLIL Teacher Training Methodology Course

Homework Frequency KS3: Weekly KS4: Weekly

Presentation transcript:

N.Negrello I.T.I. Malignani - Udine Integrals N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine Module: Integration Where: 5^ class I.T.I. “A.Malignani” Udine Time: 3 hours a week in the first term Topics of the Module: U1:Indefinite Integrals U2:Integration techniques Methodology During the lessons students are asked to hypothesise, to discuss, to give opinions, to generalise and synthesise concepts. They are expected to use problem solving. Some lessons are done with the English teacher. N.Negrello I.T.I. Malignani - Udine

Module: Integration Istituto Tecnico Industriale “A. Malignani” Udine Time Table Units Time Indefinite integral Unit 1 Whole class teaching; Use EPSILON Test for monitoring understanding Scientific language Vocabulary reinforcement 3 hours 2 hours 1 hour 1 hour with the English teacher Integration techniques Unit 2 Final test 4 hours Revising with EPSILON 2 hour TOTAL 18 hours N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine Indefinite Integrals Istituto Tecnico Industriale “A. Malignani” Udine What to do: Graphic identification of functions and anti-derivatives Apply the properties of indefinite integrals Aims What to know : The definition of the set of anti-derivatives of a function The relation between integration and derivation The definition of a definite integral The difference between indefinite and definite integral Properties of indefinite integrals Integration vocabulary N.Negrello I.T.I. Malignani - Udine

U.1.: Lesson planning Istituto Tecnico Industriale “A. Malignani” Udine Contents Definition of indefinite integral Relation of integration and derivation Recognise this relation in different contexts Cognitive Process Working out concepts and links. Asking for explanations Improving vocabulary Teacher activity Whole class teaching Interactive teaching Problem solving Learning support EPSILON B/B Total Time 6 hours + 1 hour (test) N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine U.2.: Integration Techniques Istituto Tecnico Industriale “A. Malignani” Udine What to know: Rules of substitution technique Rules of integration by part Rules of integration of rational functions Aims What to Do: Apply integration rules N.Negrello I.T.I. Malignani - Udine

Istituto Tecnico Industriale “A. Malignani” Udine Lesson planning Contents Integration by substitution Integration by part Integration of rational functions Integration of some irrational functions Cognitive Process Applying rules Asking for explanations Teacher activity Whole class teaching Interactive teaching Learning support EPSILON B/B Total Time 8 hours + 1 hour (test) N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine Istituto Tecnico Industriale “A. Malignani” Udine Examples of the use of EPSILON and of monitoring / understanding exercises Epsilon = software multimedia Monach University – Melbourne- Australia Cristina Varsavsky Cristina.Varsavsky@sci.monash.edu.au N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine EXERCISES Istituto Tecnico Industriale “A. Malignani” Udine We say: “ The integral be……. Or easily……. This is ……. 1) Complete This is………..  f(x)dx ab f(x)dx We’ll read this as integral be….. Or easily…….. 2) Fill in the gaps Integration is the…….. process of differentiation. In order to …….. with confidence it is helpful to have a good knowledge of ……….. techniques, because when ……… a function, we often try to figure out what has been ……… to give that function.For ……….integration, …….. are given and a numerical value obtained. When there are no limits, the integration is known as ………., and it is necessary to include the integration …….., usually written C. N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine Istituto Tecnico Industriale “A. Malignani” Udine N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine Istituto Tecnico Industriale “A. Malignani” Udine N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine Istituto Tecnico Industriale “A. Malignani” Udine N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine Istituto Tecnico Industriale “A. Malignani” Udine N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine Istituto Tecnico Industriale “A. Malignani” Udine N.Negrello I.T.I. Malignani - Udine

N.Negrello I.T.I. Malignani - Udine Istituto Tecnico Industriale “A. Malignani” Udine N.Negrello I.T.I. Malignani - Udine