#409778 (Haskell) No.955 ax^2+bx+c=0

提出ソース

結果

問題	No.955 ax^2+bx+c=0
コンテスト
ユーザー	Leonardone
提出日時	2019-12-18 02:34:01
言語	Haskell (9.14.1) コンパイル: `ghc -rtsopts -with-rtsopts=-K1G -o a.out -O2 _filename_` 実行: `./a.out`
結果	WA
実行時間	-
コード長	881 bytes
記録記録タグの例: 初AC ショートコード純ショートコード純主流ショートコード最速実行時間
コンパイル時間	9,355 ms
コンパイル使用メモリ	190,848 KB
実行使用メモリ	6,272 KB
最終ジャッジ日時	2026-03-28 14:22:29
合計ジャッジ時間	12,399 ms
ジャッジサーバーID （参考情報）	judge3_0 / judge2_0

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ファイルパターン	結果
sample	AC * 3
other	AC * 89 WA * 33

権限があれば一括ダウンロードができます

コンパイルメッセージ

Loaded package environment from /home/judge/.ghc/x86_64-linux-9.14.1/environments/default
[1 of 2] Compiling Main             ( Main.hs, Main.o )
Main.hs:4:75: warning: [GHC-63394] [-Wx-partial]
    In the use of ‘head’
    (imported from Prelude, but defined in GHC.Internal.List):
    "This is a partial function, it throws an error on empty lists. Use pattern matching, 'Data.List.uncons' or 'Data.Maybe.listToMaybe' instead. Consider refactoring to use "Data.List.NonEmpty"."
  |
4 | main = interact $ unlines . concat . zipWith ($) [return . show . floor . head, map show . tail] . repeat . solve . map read . words
  |                                                                           ^^^^

Main.hs:4:92: warning: [GHC-63394] [-Wx-partial]
    In the use of ‘tail’
    (imported from Prelude, but defined in GHC.Internal.List):
    "This is a partial function, it throws an error on empty lists. Replace it with 'drop' 1, or use pattern matching or 'GHC.Internal.Data.List.uncons' instead. Consider refactoring to use "Data.List.NonEmpty"."
  |
4 | main = interact $ unlines . concat . zipWith ($) [return . show . floor . head, map show . tail] . repeat . solve . map read . words
  |                                                                                            ^^^^

[2 of 2] Linking a.out

ソースコード

raw source code

-- Try yukicoder
-- author: Leonardone @ NEETSDKASU

main = interact $ unlines . concat . zipWith ($) [return . show . floor . head, map show . tail] . repeat . solve . map read . words

solve (0:0:0:_) = [-1]
solve (0:0:_:_) = [0]
solve (0:b:c:_) = [1, fromIntegral (-c) / fromIntegral b]
solve (a:0:0:_) = [1, 0]
solve (a:0:c:_) | e < 0     = [0]
                | otherwise = [2, - sqrt e, sqrt e]
                where e = fromIntegral (-c) / fromIntegral a
solve (a:b:0:_) = [2, 0, fromIntegral (-b) / fromIntegral a]
solve (a:b:c:_) | d < 0  = [0]
                | d == 0 = [1, fromIntegral (-b) / fromIntegral (2*a)]
                | d > 0  = [2, (fromIntegral (-b) - sqrt (fromIntegral d)) / fromIntegral (2*a)
                             , (fromIntegral (-b) + sqrt (fromIntegral d)) / fromIntegral (2*a)]
                where d = b * b - 4 * a * c
solve _ = undefined