Advert description
I’m a former AL maths student now at the University of Surrey (a top 25 UK uni) in 1st year studying aerospace engineering.
I'm willing to provide high quality and passionate tuition of GCSE and AS/A2 maths at a lower cost than most others - £15 an hour for GCSE, £20 for A level (compensates for lack of job experience).
Based in Guildford, Surrey
As someone who just finished their journey as a maths student at school, I know how it feels to start from scratch and what it takes to rise to this level. I want to give younger students who I used to be in the same position as the same or better opportunity to help them succeed and make them realise how beautiful and beneficial of a subject maths is.
To deliver my service (if not possible in person), I am able to write on my iPad effectively and share my work with the student via a screen shared call, collaboratively as well on applications such as Microsoft OneNote.
There are many benefits to this system - student can look back on our reviewed work and I can even offer additional help on small questions outside of the allotted time this way.
I aim to ensure a genuine understanding of the concepts in the student, but always aim for the most effective method in delivering it that would make sense to me - ensuring maximum efficiency and value for my client's money.
Achieved an A* grade (87/120) internally in WJEC's 2023 A level Maths unit 3 A2 pure paper (professionally invigilated by my school for their final internal YR13 mock exam), which predicted the same and is verified by my school.
Achieved a grade A in the whole qualification ultimately as well as a grade 8 at GCSE. Slightly stronger in pure mathematics around an A* level, but grade A in applied.
Internal A2 mock result proof:
external A level stats are as follows:
Overall - 506/600 UMS - Grade A - Mid boundary
145/150 UMS grade A in AS pure unit 1
125/150 UMS grade A in A2 applied unit 4 (statistics/mechanics)
184/210 UMS grade A in A2 pure unit 3 (5 UMS away from A* grade) - top end boundary
External A level results proof: