如何给不等式作图

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学习代数的时候,可能有的问题需要你把不等式作图,本文可以帮你一忙。不等式可以在坐标平面(含x、y轴)或一条直线数轴上画出来。两种都可以很好表示不等式。下面是两种方法:

方法 1
方法 1 的 2:

直线数轴法

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    提出括号内的所有东西,把和变量无关的数字都合并。 -2x 2 + 5x < -6(x + 1) 变成-2x 2 + 5x < -6x - 6
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    如果最高次的变量是正的,这样最简单,把同类项合并。(比如-6x 和 -5x)0 < 2x 2 -6x - 5x - 6变为0 < 2x 2 -11x - 6
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    假设不等号为等号,把所有变量的值解出来。必要的话用因式分解。 0 = 2x 2 -11x - 6,0 = (2x + 1)(x - 6), 2x + 1 = 0, x - 6 = 0 2x = -1, x = 6x = -1/2, x = 6
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    若是小于 (<) 或大于 (>),画空心圈。若小于等于 (≤) 或大于等于 (≥), 则画实心圈。本例子中是大于号,所以是空心圈。
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    在解划分出来的各个区间随便选个数字,代入不等式,如果符合不等式,则把这个区间涂上阴影。 在区间(-∞,-1/2)取-1 ,验证得0 < 2x 2 -11x - 6,0 < 2(-1) 2 -11(-1) - 6,0 < 2(1) + 11 - 6, 0 < 7,是对的,因此涂黑(-∞, -1/2)区间,然后在(-1/2, 6) 选用0, 0 < 2(0) 2 -11(0) - 6,0 < 0 + 0 - 6,0 < -6,不正确,所以排除(-1/2,6)区间。最后在(6,∞)区间选择10,代入得0 < 2(10) 2 - 11(10) + 6,0 < 2(100) - 110 + 6,0 < 200 - 110 + 6,0 < 96,也是正确的。所以(6,∞)涂黑。在涂黑区域后,用箭头表示这个区间延伸到无限大(小)处。这样就可以表示不等式了。
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方法 2
方法 2 的 2:

坐标平面法

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如果可以画线,你就可以画不等式。把不等式当成任何其他 y = mx + b 格式的线性方程来解就好。

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    整理不等式,让y单独在一边。记住y变换正负的时候,要改变不等号方向(大于变小于等等)。 y - x ≤ 2,y ≤ x + 2
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    y = mx + b ,b是和y轴相交点的纵坐标,m是斜率。
    • 看看用实线还是虚线。如果是“大于、小于”,则是虚线,包括“等于”则是实线。
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    不等号方向决定你涂黑的地方。本等式中,y是小等于右侧线的表达式的,因此是线下方的区域涂黑。(如果是大等于,则涂线上方的区域)
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小提示

  • 先要记得把不等式化简。
  • 如果不等式小等于、大等于:
    • 数轴上是实心圈
    • 坐标平面上是实线
  • 如果不等式中是小于、大于:
    • 数轴中是空心圈
    • 坐标平面上是虚线
  • 如果实在有问题,可以把不等式输入画图计算器,试试通过图画倒着一步步来做。
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你需要准备

  • 纸盒铅笔
  • 画图计算器(可选)
  • 尺子,用来画直线(可选)

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