「旧帝・国立大学医学部」受験対策講座(7)
Genius is the man of average ability who makes an effort.
(Albert Einstein)
私は「教育学部」卒(文系)なので塾生の方に「数学Ⅲ」の指導を依頼された時に困惑しました。しかし、期待に応えたいので独学を始めました。オリジナル、チェック&リピート、1対1、赤本(京大)をそれぞれ2周やりました。河合と駿台の京大模試を10回受け、京大二次を7回受けて
「たぶん、これで指導は大丈夫」
という実感を持てるまで10年かかりました。
なのに、私の優秀な生徒の中には3年で私に追いついてきます。私がどれほど凡才か分かる事実です。でも、
「2000題解けばマスターできる」
という統計の正しさを証明してもいます。平均的な問題集7冊分です。
それだけ解けば、凡才でも旧帝合格ラインくらいは行けます。参考書や予備校の評論家をやっている時間があるなら、1題でも多く解くべきです。
I graduated from the "Faculty of Education" (liberal arts), so I was puzzled when I was asked to teach "Math III" to tutoring students. However, I wanted to meet their expectations, so I started self-study. I did two rounds each of Original, Check & Repeat, 1:1, and Red Book (Kyoto University). I took the Kyoto University mock exam of Kawai and Sundai 10 times, and the second round of Kyoto University 7 times.
I took 10 mock exams for Kyoto University at Kawai and Sundai, and 7 times for the second round of Kyoto University.
It took me 10 years to feel that my teaching was good enough.
And yet, some of my best students catch up with me in three years. It is a fact that shows how mediocre I am. But I have a saying.
I have proven the statistics correct that
"you can master it by solving 2,000 problems.”
I have also proved that this statistic is correct. That's the equivalent of seven books of average problems.
If you solve that many problems, even a mediocre student can pass the entrance exam of the former imperial university. If you have time to spend on reference books and critics of prep schools, you should solve as many problems as possible.
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