题目内容
4.m为何正整数时,方程组$\left\{\begin{array}{l}{mx+y+z=0}\\{3mx+(m-1)y+(2m-1)z=0}\\{2mx+3y+(m+3)z=0}\end{array}\right.$有非零解,并求出一组解使它满足x+2y+3z=7.分析 化简方程组$\left\{\begin{array}{l}{mx+y+z=0①}\\{3mx+(m-1)y+(2m-1)z=0②}\\{2mx+3y+(m+3)z=0③}\end{array}\right.$得(5-m)(y+z)=0,从而讨论可得m=5;代入可得$\left\{\begin{array}{l}{5x+y+z=0}\\{15x+4y+9z=0}\\{10x+3y+8z=0}\end{array}\right.$,从而分析可得$\left\{\begin{array}{l}{5x+y+z=0}\\{10x+3y+8z=0}\\{x+2y+3z=7}\end{array}\right.$,从而解得.
解答 解:由题意,
$\left\{\begin{array}{l}{mx+y+z=0①}\\{3mx+(m-1)y+(2m-1)z=0②}\\{2mx+3y+(m+3)z=0③}\end{array}\right.$
①+③-②得(5-m)(y+z)=0,
若y+z=0,则mx=0,
解得m=0(舍)或x=0;
将x=0代入②,化简得mz=0,
又∵m≠0,则z=0=y;
故不成立;
故m=5;
代入方程组得,
$\left\{\begin{array}{l}{5x+y+z=0}\\{15x+4y+9z=0}\\{10x+3y+8z=0}\end{array}\right.$,
比较容易发现上下两方程相加得到中间的一个,
因而有一个方程无效,删掉中间的一个即可;
再加上x+2y+3z=7,联立可得,
$\left\{\begin{array}{l}{5x+y+z=0}\\{10x+3y+8z=0}\\{x+2y+3z=7}\end{array}\right.$,
解得,x=-$\frac{7}{8}$,y=$\frac{21}{4}$,z=-$\frac{7}{8}$.
点评 本题考查了三元一次方程组的化简与解法,属于中档题.
| A. | (-∞,1] | B. | [1,+∞) | C. | (-∞,2] | D. | [2,+∞) |