2- O baricentro de um triângulo ABC é G(-4/3,4/3), o ponto médio do lado BC é N(-5/2,-1) e ponto médio do lado AB é M(0,1/2). Determine as coordenadas do vértice A, B e C.
Ooobg
por juxcarvalho » Dom Ago 18, 2013 10:09
por nakagumahissao » Qui Out 08, 2015 15:52
![\frac{{x}_{1} + {x}_{2}}{2} = 2 \Rightarrow {x}_{1} + {x}_{2} = 4\;\;\;\;\;[1]](/latexrender/pictures/abdc8d8babbb3235f2142534ae1f70ff.png "\frac{{x}_{1} + {x}_{2}}{2} = 2 \Rightarrow {x}_{1} + {x}_{2} = 4\;\;\;\;\;[1]")
![\frac{{x}_{2} + {x}_{3}}{2} = 3 \Rightarrow {x}_{2} + {x}_{3} = 6\;\;\;\;\;[2]](/latexrender/pictures/69ea832fa7e21b51c1ca4f4860172018.png "\frac{{x}_{2} + {x}_{3}}{2} = 3 \Rightarrow {x}_{2} + {x}_{3} = 6\;\;\;\;\;[2]")
![\frac{{x}_{1} + {x}_{3}}{2} = 6 \Rightarrow {x}_{1} + {x}_{3} = 12\;\;\;\;\;[3]](/latexrender/pictures/5271c09949a7c1aaa7d4bdfbe0184d19.png "\frac{{x}_{1} + {x}_{3}}{2} = 6 \Rightarrow {x}_{1} + {x}_{3} = 12\;\;\;\;\;[3]")
![{x}_{1} + {x}_{2} = 4 \Leftrightarrow {x}_{1} = 4 - {x}_{2} \;\;\;\;[4]](/latexrender/pictures/d25bcc590cfcd061c7b72c1e1a8b73f0.png "{x}_{1} + {x}_{2} = 4 \Leftrightarrow {x}_{1} = 4 - {x}_{2} \;\;\;\;[4]")
![{x}_{1} + {x}_{3} = 12 \Leftrightarrow 4 - {x}_{2} + {x}_{3} = 12 \Leftrightarrow {x}_{3} = 8 + {x}_{2} \;\;\;\;[5]](/latexrender/pictures/55f514d18f1a6207e942a6de6bac8470.png "{x}_{1} + {x}_{3} = 12 \Leftrightarrow 4 - {x}_{2} + {x}_{3} = 12 \Leftrightarrow {x}_{3} = 8 + {x}_{2} \;\;\;\;[5]")
![{x}_{2} + {x}_{3} = 6 \Rightarrow {x}_{2} + 8 + {x}_{2} = 6 \Rightarrow 2{x}_{2} = -2 \Rightarrow {x}_{2} = -1 \;\; [6]](/latexrender/pictures/00937ae505061c85db0dee833b9d55b6.png "{x}_{2} + {x}_{3} = 6 \Rightarrow {x}_{2} + 8 + {x}_{2} = 6 \Rightarrow 2{x}_{2} = -2 \Rightarrow {x}_{2} = -1 \;\; [6]")
![{x}_{3} = 7 \;\;\;\;\;[7]](/latexrender/pictures/357495619e4427ba0c7902d851aa0eda.png "{x}_{3} = 7 \;\;\;\;\;[7]")
![{x}_{1} = 5 \;\;\;\;\;[8]](/latexrender/pictures/4f15f7e893ed9f097936ee2997e0aadc.png "{x}_{1} = 5 \;\;\;\;\;[8]")
![\frac{{y}_{1} + {y}_{2}}{2} = 1 \Rightarrow {y}_{1} + {y}_{2} = 2 \Rightarrow {y}_{1} = 2 - {y}_{2} \;\;\;\;\;[9]](/latexrender/pictures/38f1c8b0ab2c70b56b7e3c423730099c.png "\frac{{y}_{1} + {y}_{2}}{2} = 1 \Rightarrow {y}_{1} + {y}_{2} = 2 \Rightarrow {y}_{1} = 2 - {y}_{2} \;\;\;\;\;[9]")
![\frac{{y}_{2} + {y}_{3}}{2} = 3 \Rightarrow {y}_{2} + {y}_{3} = 6\;\;\;\;\;[10]](/latexrender/pictures/793dbd201a4efd84f627a15f0ac38159.png "\frac{{y}_{2} + {y}_{3}}{2} = 3 \Rightarrow {y}_{2} + {y}_{3} = 6\;\;\;\;\;[10]")
![\frac{{y}_{1} + {y}_{3}}{2} = 2 \Rightarrow {y}_{1} + {y}_{3} = 4\;\;\;\;\;[11]](/latexrender/pictures/382a3ae749016ad72dd3027795716271.png "\frac{{y}_{1} + {y}_{3}}{2} = 2 \Rightarrow {y}_{1} + {y}_{3} = 4\;\;\;\;\;[11]")
![{y}_{1} + {y}_{3} = 4 \Rightarrow 2 - {y}_{2} + {y}_{3} = 4 \Rightarrow {y}_{3} = 2 + {y}_{2}\;\;\;\;[12]](/latexrender/pictures/b079602a869a5b79cb933fe872bb05a2.png "{y}_{1} + {y}_{3} = 4 \Rightarrow 2 - {y}_{2} + {y}_{3} = 4 \Rightarrow {y}_{3} = 2 + {y}_{2}\;\;\;\;[12]")
![{y}_{2} + {y}_{3} = 6 \Rightarrow {y}_{2} + 2 + {y}_{2} = 6 \Rightarrow {y}_{2} = 2\;\;\;\;[13]](/latexrender/pictures/3e9fb3e0aecd9bff378380a182a98597.png "{y}_{2} + {y}_{3} = 6 \Rightarrow {y}_{2} + 2 + {y}_{2} = 6 \Rightarrow {y}_{2} = 2\;\;\;\;[13]")
![{y}_{3}= 4\;\;\;\;[14]](/latexrender/pictures/4b25653843e300d213c039cf237e615b.png "{y}_{3}= 4\;\;\;\;[14]")
![{y}_{1}= 0\;\;\;\;[15]](/latexrender/pictures/0ef01c23a4f94a1e8e3e0f1cbcdaac9c.png "{y}_{1}= 0\;\;\;\;[15]")
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