Giải phương trình tìm x; y
----- Nội dung ảnh -----
1)
\[
\begin{cases}
2x - y + z = 1 \\
3x + 4y - 5z = 17 \\
8x - 6y - 32z = 42 \\
\end{cases}
\]
2)
\[
\frac{5(x-1)}{x+2y} + \frac{3(y+1)}{x-2y} = 8
\]
3)
\[
20(x-1) + 7(6y+1) = 6
\]
4)
\[
\begin{cases}
x - |y| = 5 \\
|x + 1| + 3|y - 5| = 21 \\
\end{cases}
\]
5)
\[
x - 4y = 5
\]
6)
\[
2 \left| x - 2y \right| + \left| 2x + y \right| = 7
\]
7)
\[
\begin{cases}
6xy - 5(2x + y) \\
3yz = 2(y + z) \\
7z = 10(z + x) \\
\end{cases}
\]
8)
\[
\frac{xy}{x + y} = \frac{6}{5}
\]
\[
\frac{-yz}{y + z} = \frac{4}{3}
\]
1)
\[
\begin{cases}
2x - y + z = 1 \\
3x + 4y - 5z = 17 \\
8x - 6y - 32z = 42 \\
\end{cases}
\]
2)
\[
\frac{5(x-1)}{x+2y} + \frac{3(y+1)}{x-2y} = 8
\]
3)
\[
20(x-1) + 7(6y+1) = 6
\]
4)
\[
\begin{cases}
x - |y| = 5 \\
|x + 1| + 3|y - 5| = 21 \\
\end{cases}
\]
5)
\[
x - 4y = 5
\]
6)
\[
2 \left| x - 2y \right| + \left| 2x + y \right| = 7
\]
7)
\[
\begin{cases}
6xy - 5(2x + y) \\
3yz = 2(y + z) \\
7z = 10(z + x) \\
\end{cases}
\]
8)
\[
\frac{xy}{x + y} = \frac{6}{5}
\]
\[
\frac{-yz}{y + z} = \frac{4}{3}
\]