Computer Science (3 Years) [BSc]
UCAS course code: G400
Degree awarded: BSc
Duration: 3 years
Typical A level offer: Grades A*AA including mathematics.
Course fees: Tuition fees for home/EU students commencing their studies in September 2018 will be £9,250. Future inflationary increases may also be applied to each subsequent year of your course, subject to government regulations on fee increases. Tuition fees for international students will be £22,000 per annum. For general information please see the undergraduate fees pages.
Scholarships/sponsorships: All new UK/EU (home tuition fee) students, applying for first year entry, who achieve an A*A*A (including A* in mathematics) at the first sitting will be awarded the Kilburn Entry Scholarship worth £1,000. Other UK, European and international qualifications gained by home tuition fee students will also be considered for the award, subject to academic approval.
Number of places/applicants: The School of Computer Science receives in the region of 2000 applications per year for 225 places across our undergraduate degree courses.
Contact telephone: 44 (0)161 275 6124
Through the development of new applications in science, engineering, and business, Computer Science is radically changing the way in which we experience our world. This programme equips students with the skills needed to contribute to this exciting and rapidly evolving field.
Computer Science is our most flexible programme, allowing you to chose course units to reflect your developing and changing interests. Furthermore, a wide range of themes from across the discipline allow you to specialise in the second and third years.
You will gain not only knowledge and practical experience of the latest technologies, but also a grounding in the underlying principles of the subject. It is this combination of skills that enable our graduates to keep pace with this fast moving subject, and secure rewarding careers that can be pursued almost anywhere in the world.
Detailed programme and course unit information is available here