爱因斯坦说过:“真正可贵的因素是直觉”.直觉思维是对一个问题不经过严密推理论证,而是凭借大脑对该问题的来源、题设条件、图形等作出感性认识,以直觉作出假设,推测和判断,从而找到解决问题方法的一种心理现象.直觉思维是数学学习中的“灵光闪现”.下面例谈直觉思维在解题中的应用.一、数感与直觉数感就是对数的特别感觉,当见到数时经过大脑的综合分析,获取重要的信息,而这种信息对解题的影响是至关重要的. Einstein said: “The real precious factor is intuition.” Intuitive thinking is to make a perceptual understanding of the origin, setting conditions, graphics, etc. of a problem without a rigorous reasoning of a question Intuition make assumptions, speculations and judgments to find a way to solve the problem of psychological phenomenon. Intuition thinking is mathematical learning “Emotional flash.” The following example talk about intuitive thinking in the problem-solving applications. Intuitive sense of the number of log is a special feeling, when you see the number of brain through a comprehensive analysis, access to important information, and this information on the impact of the problem is crucial.