1 Answer

Marius Pop · Answer 1 · 2021-03-12T22:39:12+0000

Answer:

$r=4\\ \\s=3\\ \\t=-1$

Explanation:

Given the system of three linear equations:

$\left\{\begin{array}{l}-6r+5s+2t=-11\\ \\-2r+s+4t=-9\\ \\4r-5s+5t=-4\end{array}\right.$

Cheange the positions of the first and the second equations:

$\left\{\begin{array}{l}-2r+s+4t=-9\\ \\-6r+5s+2t=-11\\ \\4r-5s+5t=-4\end{array}\right.$

Multiply the first equation by -3 and add it to the second equation and then multiply the first equation by 2 and add it to the third equation:

$\left\{\begin{array}{r}-2r+s+4t=-9\\ \\2s-10t=16\\ \\-3s+13t=-22\end{array}\right.$

Multiply the second equation by 3, the third equation by 2 and add them:

$\left\{\begin{array}{r}-2r+s+4t=-9\\ \\2s-10t=16\\ \\-4t=4\end{array}\right.$

From the third equation,

t=-1

Substitute it into the second equation:

$2s-10\cdot (-1)=16\\ \\2s+10=16\\ \\2s=6\\ \\s=3$

Substitute
t=-1 and
s=3 into the first equation:

$-2r+3+4\cdot (-1)=-9\\ \\-2r+3-4=-9\\ \\-2r-1=-9\\ \\-2r=-9+1\\ \\-2r=-8\\ \\2r=8\\ \\r=4$

Hence,

$r=4\\ \\s=3\\ \\t=-1$

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