1948 Milan–San Remo

The 1948 Milan–San Remo was the 39th edition of the Milan–San Remo cycle race and was held on 19 March 1948.[2] The race started in Milan and finished in San Remo. The race was won by Fausto Coppi of the Bianchi team.[3][4]

1948 Milan–San Remo
Race details
Dates19 March 1948
Stages1
Distance290.5[1] km (180.5 mi)
Winning time7h 33' 20"
Results
  Winner  Fausto Coppi (ITA) (Bianchi)
  Second  Vittorio Rossello (ITA) (Legnano–Pirelli)
  Third  Fermo Camellini (ITA)

General classification
Final general classification[2][3]
Rank Rider Team Time
1  Fausto Coppi (ITA) Bianchi 7h 33' 20"
2  Vittorio Rossello (ITA) Legnano–Pirelli + 5' 17"
3  Fermo Camellini (ITA) s.t.
4  Olimpio Bizzi (ITA) + 8' 55"
5  Italo De Zan (ITA) Atala s.t.
6  Sergio Maggini (ITA) Wilier Triestina s.t.
7  Giordano Cottur (ITA) Wilier Triestina s.t.
8  Bernard Gauthier (FRA) Mercier–Hutchinson s.t.
9  Enzo Bellini (ITA) Cimatti s.t.
10  Mario Vicini (ITA) Bianchi s.t.
gollark: Although I don't know why you can't long-divide it, p and q are just constants for the purposes of that.
gollark: That lets you work out a/b/c/d, which you can substitute back into (x-1)(ax^3+bx^2+cx+d).
gollark: So:2 = a (x^4 terms)p = b - a (x^3 terms)-6 = c - b (x^2 terms)q = d - c (x terms)6 = -d (constant terms)
gollark: So you can do `2x^4+ px^3 - 6x^2 + qx + 6 = ax^4 + (b-a)x^3 + (c-b)x^2 + (d-c)x - d`, and you know the coefficients on x^4 and so on should be equal.
gollark: Which you can then simplify to ax^4 + (b-a)x^3 + (c-b)x^2 + (d-c)x - d.

References
  1. "Milano - San Remo Bicycle Race". BikeRaceInfo. Retrieved 20 February 2020.
  2. "1948 Milano - San Remo". BikeRaceInfo. Retrieved 25 January 2018.
  3. "39ème Milan-San Remo 1948". Memoire du cyclisme. Archived from the original on 19 April 2004.
  4. "1948 Milano - Sanremo". First Cycling. Retrieved 25 January 2018.
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