国际学生入学条件
Official high school/secondary school transcripts must include grades from 9th through 11th grade as well as courses being taken in the 12th grade. Early Decision applicants are encouraged to submit first marking period grades, when they become available. Regular Decision applicants will be required to submit mid-year grades from 12th grade, when they become available.
Applicants studying in an international exam-based curriculum, must submit:
All official high school transcripts
Final exam results (for example IGCE/GCSE, CBSE X/AISSCE X)
Predicted exam results, if available.
International English Language Testing System (IELTS) - 7, Test of English as a Foreign Language (TOEFL) - 100 (Internet-based test), 75 (Paper-delivered test).
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雅思考试总分
7.0
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雅思考试指南
- 雅思总分:7
- 托福网考总分:100
- 托福笔试总分:160
- 其他语言考试:Duolingo - 120
CRICOS代码:
申请截止日期: 请与IDP顾问联系以获取详细信息。
课程简介
数学是科学,工程领域和社会科学中许多学科的基础,并且随着这些学科变得越来越定量化,这种影响也越来越大。认识到在我们的学位获得者可以使用的各种指导中的重要作用,数学课程为本科生提供了多种选择。从微积分的非理论处理和组合数学,基本数论和射影几何的课程到各种复杂的数学,包括实数和复数分析,微分几何,抽象代数,代数和几何拓扑,代数几何,动力学和偏微分方程。完成数学专业的文学学士学位后,学生将能够:在微积分和线性代数上达到实践和理论流利程度。在广泛的数学中心领域获得本科水平的背景知识。熟悉正式的数学推理,包括证明。
Mathematics lies at the foundation of many disciplines in the sciences, engineering fields, and the social sciences, and this influence is growing as these subjects become increasingly quantitative. Recognizing this important role in the wide variety of directions available to our degree recipients, the program in mathematics provides undergraduates with a spectrum of choices. These range from nontheoretical treatments of calculus and courses in combinatorics, elementary number theory, and projective geometry to a broad variety of sophisticated mathematics, including real and complex analysis, differential geometry, abstract algebra, algebraic and geometric topology, algebraic geometry, dynamics, and partial differential equations. Upon completing the BA degree with a major in Mathematics, students will be able to: Achieve both practical and theoretical fluency in calculus and linear algebra. Acquire a background at the undergraduate level in a wide variety of central areas of mathematics. Be acquainted with formal mathematical reasoning, including proofs.
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