Utvecklande inlärningsmetoder : Matematik

Ericsson, Marie-Louise

January 2006

No description available.

MATHEMATICS

MATEMATIK

Dyskalyli och allmänna matematiksvårigheter

Wegner, Ann-Cathrine

January 2006

<p>Dyscalculia and General Mathematical Dificulties</p>

MATHEMATICS

MATEMATIK

Matematiksvårigheter : En undersökning om elever med matematiksvårigheter

Larsson, Maria

January 2006

<p>Abstract</p><p>My essay is about pupils with difficulties in mathematics. I have choosed to do a literaturestudy and interviews of teachers to get some answers to my framing of the questions.</p><p>· What is mathematical difficulties?</p><p>· How do we discover pupils with mathematical difficulties?</p><p>· What can a teather do to facilitate for pupils with mathematical difficulties?</p><p>· What resources is there to help pupils with mathematical difficulties?</p><p>I have done my investigationin two schools to be abel to see if the schools are working in the same way and have the same prerequisite of pupils with mathematical difficulties.</p><p>By doing an interview with both teachers and remedial teachers I have got a better insight how to help pupils in the best way. Both of this schools are putting the pupils in the middle and give them wath they need to get to the destinations that claims. The procedure are not the same between the schools. The bigger school have more resources while the smaller school have more material.</p>

MATHEMATICS

MATEMATIK

Smooth area preserving isotopies of self transverse immersions of <em>S¹ into R²</em>

Karlsson, Cecilia

January 2009

<p>Let C and C′ be two smooth self transverse immersions of S1 into R2. BothC and C′ divide the plane into a number of disks and one unbounded component.An isotopy of the plane which takes C to C′ induces a 1-1 correspondence betweenthe disks of C and C′. An obvious necessary condition for there to exist an areapreserving isotopy of the plane taking C to C′ is that there exists an isotopy forwhich the area of every disk of C has the same area as the corresponding disk ofC′. In this paper we show that this is also a sufficient condition.</p>

MATHEMATICS

MATEMATIK

Combinatorial geometries in model theory

Ahlman, Ove

January 2009

<p>Model theory and combinatorial pregeometries are closely related throughthe so called algebraic closure operator on strongly minimal sets. Thestudy of projective and ane pregeometries are especially interestingsince they have a close relation to vectorspaces. In this thesis we willsee how the relationship occur and how model theory can concludea very strong classi cation theorem which divides pregeometries withcertain properties into projective, ane and degenerate (trivial) cases.</p> / <p>Modellteori är ett ämne som är starkt relaterat till studien av kombinatoriska pregeometrier, detta genom den algebraiska tillslutningsoperatorn som agerar på starkt minimala mängder. Studien av projektivaoch affina pregeometrier är speciellt intressant genom dessas relation till vektorrum. I den här uppsatsen kommer vi att se hur denna relation uppstår och hur modellteori kan förklara en väldigt stark klassifikationssats, som delar upp pregeometrier med speciella egenskaper i projektiva, affina och degenererade (triviala) fall.</p>

MATHEMATICS

MATEMATIK

Predicting Turning Points

Traustason, Jón Árni

January 2009

No description available.

MATHEMATICS

MATEMATIK

A Modified Binomial Lattice Monte Carlo Method with Applications to European Barrier Options

Wu, Hao

January 2009

No description available.

MATHEMATICS

MATEMATIK

Pair Trading in Optimal Stopping Theory

Qiang, Li

January 2009

No description available.

MATHEMATICS

MATEMATIK

On Simulation Methods for Two Component Normal Mixture Models under Bayesian Approach

Liang, Liwen

January 2009

No description available.

MATHEMATICS

MATEMATIK

The Least-Squares Method for American Option Pricing

Huang, Xuejun, Huang, Xuewen

January 2009

No description available.

MATHEMATICS

MATEMATIK