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Python实现3行代码解简单的一元一次方程

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Jun 16, 2016 am 08:42 AM

pythonequation解

本文所述实例为Python用3行代码实现解一元一次方程，代码简洁高效，具体用法如下：

>>> solve("x - 2*x + 5*x - 46*(235-24) = x + 2")
3236.0

功能代码如下：

def solve(eq,var='x'):
  eq1 = eq.replace("=","-(")+")"
  c = eval(eq1,{var:1j})
  return -c.real/c.imag

下面就来解读下代码吧。

首先是第一行，它将等式进行了变形，生成了一个结果为0的算式“x - 2*x + 5*x - 46*(235-24) -( x + 2)”。
第二行用eval来执行这个算式，并将x = 1j代入算式，结果是-9708+3j。
注意x = 1j，所以这个方程就化简为“-9708+3x = 0”了，只要将-(-9708) / 3就能得到x了。
而-9708是这个复数的实部，3是这个复数的虚部，于是结果变成了“-c.real/c.imag”。
因此很显然，这个函数是不能解复数方程的。
顺带一提，Python 2.x的/运算会使用整数除法，导致小数部分丢失，所以要获得正确结果就应该使用Python 3.x。

希望本文所述实例对大家学习Python能有所帮助。

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