 DM: Thanks for that Sabbir. Paper 6 is considerably more difficult. I particularly the geometric application of the palindromic quartic (number 8). This still shows STEP in a good light as a decent examination of able students.
Besides the obvious increase in difficulty compared with today's papers, I think there is a huge qualitative difference in the way questions are asked and what is expected of students in terms of cognitive ability. I also managed to get hold of a University of Cambridge GCE A & S level book for 1951, which contains papers for all subjects (including "Handicraft" :), and it is a real gem. The format of the papers is much more familiar to me - similar to the exams I took back in 1988. Browsing through the questions, it looks like they are of a similar level to those I remember from the late 1960s, so I guess that standards were generally maintained up to around 1970 after which the complaints began. I note that there are only two papers (first seems to cover algebra and calculus and the second covers geometry, applied maths and statistics), and one scholarship paper at A level compared with the 5 subject papers from 1918, though the subject is now split into two levels of difficulty - Mathematics and Further Mathematics. It looks like the 1918 distinction papers were the equivalent of the Further Maths A and S papers of today, though my general impression is that the 1918 ones were harder. I am going to head off home soon, so I am not going to type out any more questions. However, these are the headers of the papers for comparison with the present day's miserable offerings: ================== University of Cambridge Local Examinations Syndicate General Certificate of Education Mathematics, Advanced Level, Paper I (Three hours) Full marks can be obtained by complete answers to about ten questions, but a pass mark can be obtained by good answers to about four questions or their equivalent. Write on one side of the paper only. Mathematical tables and squared paper may be obtained from the Supervisor. 1. The pth term of a progression is P, the qth term is Q, the rth term is R. Show that, if the progression is arithmetical, P(q-r) + Q(r-p) + R(p-q) = 0, and that, if it is geometrical, (q - r) log P + (r - p) log Q + (p - q) log R = 0. ...etc. (12 questions on paper) ===================== Mathematics Advanced Level Paper II (Three hours) Answer the whole of Section A and four questions from Section B which include any of the questions on statistics. Full marks can be obtained... (as for Paper I) ===================== Mathematics Scholarship Paper (Paper III) (Three hours) Full marks can be obtained by complete answers to about ten questions. 1. Prove that 2 cos x/2 (cos x - cos 2x) = cos x/2 - cos 5x/2 Solve the equation cos x - cos 2x = 1/2 giving the values of x which lie in the range 0 <= x <= 2 pi etc... =============== Finally, Furtyher Mathematics Scholarship Paper (Paper III) (Three hours) [As above] 1. (i) Prove that the sum of the first n terms of the series sin x + 2 sin 2x + 3 sin 3x + ... is ((n+1) sin nx - n sin (n+1)x)/(2 (1 - cosx)) (ii) Find the sum of the first n terms of the series 1 - 5x + 9x^2 - 13x^3 + ... and write down the sum to infinity if |x| < 1. etc...(12 questions). ====================== Okay, that's enough for today. Have a pleasant weekend! Best wishes, Sabbir
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