如何求三角形的第三个角

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共同创作者是 Grace Imson, MA

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当你已知三角形其中两个角的角度后,求第三个角的大小并不是件难事。你只需要用180°减去已知的两个角度即可得到第三个角的大小。然而,我们也有计算第三个角的其他方法,具体使用哪种方法则取决于你正处理的问题是哪样的。如果你想要学习如何求复杂难题中的三角形第三个角度大小,那么阅读本文来学习求解方法吧。

方法 1
方法 1 的 3:

借助于另外两个角的大小

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    你需要借助三角形的内角和定理,即所有三角形的内角相加得到的和永远是180°。该定理是亘古不变的真理。因此,如果你已知三角形的两个角求第三个角的大小,那么你首先要将已知的两个角的角度相加。例如,你已知某三角形的两个角是80°和65°。那么将其相加,(80° + 65°)得到145°。
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    根据内角和定理,我们知道三角形内角之和为180°。那么,已知的两角加上未知的第三个角的结果一定是180°。在本例中,180° - 145° = 35°。
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    现在已计算出剩余第三个角的大小为35°。如果你不放心自己的计算,那么你可以再检查一下。你可以再次将三角形的三个内角相加,如果得到180°,那么你的计算结果无误。在本例中,80° + 65° + 35° = 180°。至此,问题已解决。
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方法 2
方法 2 的 3:

使用变量计算角度

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    有时候,你可能没有那么幸运地已知两个角的大小,而是已知几个变量或者几个变量和一个角度。例如在本例中,我们已知三角形的三个内角分别是"x," "2x,"和24",然后求x的大小。首先,先将已知的信息写下来。
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    此处我们遵循的定理与上部分的内角和一致。我们将三角形所有的角度(包括变量)相加,得到 x + 2x + 24° = 3x + 24°.
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    将三角相加后,用180来减去上步结果得到0。步骤如下:
    • 180° - (3x + 24°) = 0
    • 180° - 3x - 24° = 0
    • 156° - 3x = 0
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    现在化解等式将变量放在一侧,数值放在另一侧。你将得到156° = 3x。此时将等式两边同时除以3得到x = 52°。这就意味着,第三个角的大小是52°。另外一个未知角(2x)的大小是2 x 52°,即104°。
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    如果你想确保结果的正确性,那么将三个角的角度相加得到180°即可保证结果的正确。即52° + 104° + 24° = 180°。至此,问题已被正确解决。
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方法 3
方法 3 的 3:

使用其他方法求解

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    等腰三角形的两个边(腰)相等,且有两个相等的角(底角)。其中其相等的边(腰)被斜条标记以显示两者相等。如果你已知其中一个底角的大小,那么你就能求出三个角的大小。具体方法如下:
    • 如果一个底角的大小是40°,那么另一个底角的大小也是40°。并且,你可以用180°减去两个底角的和40° + 40° (即80°)来求第三个角的大小。具体步骤是180° - 80° = 100°,那么第三个角为100°。
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    等边三角形的三边相等且三个内角大小相等。其三边的中间部分被两条斜线标记以表示三边相等。这也意味着等边三角形的三角相等且都为60°。你可以将三角相加来复查你的计算。具体方法如下:60° + 60° + 60° = 180°。
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    如果已知题目中的三角形为直角三角形,且已知一个角为30°。那么,你就已知两个角了,其中一个是直角90°,一个是30°的角。然后再利用三角形内角和定理,先将已知的两角相加(30° + 90° = 120°),然后用180°减去该值。即180° - 120° = 60°。那么第三个角为60°。
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警告

  • 如果加法计算或者减法计算中出现错误,那么会导致最终结果的错误。因此你最好多复查你的计算以防错误的产生。



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参考

  1. http://www.virtualnerd.com/pre-algebra/geometry/triangles/angles-triangles/triangle-missing-variable-angles-example
  2. http://www.mathopenref.com/trianglesolving.html
  3. http://www.mathsteacher.com.au/year7/ch09_polygons/02_anglesum/sum.htm
  4. http://www.mathsisfun.com/algebra/trig-sine-law.html

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