代数式的恒等变形(1).已知x²+y²+z²-2x+4y-6z+14=0,求(x-y-z)^2010(2)设m、n满足m²n²+m²+n²+10mn+16=0,求m+n的值(3)已知14(a²+b²+c²)=(a+2b+3c)² 求证a:b:c=1:2:3(4)已知实

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代数式的恒等变形(1).已知x²+y²+z²-2x+4y-6z+14=0,求(x-y-z)^2010(2)设m、n满足m²n²+m²+n&#

代数式的恒等变形(1).已知x²+y²+z²-2x+4y-6z+14=0,求(x-y-z)^2010(2)设m、n满足m²n²+m²+n²+10mn+16=0,求m+n的值(3)已知14(a²+b²+c²)=(a+2b+3c)² 求证a:b:c=1:2:3(4)已知实
代数式的恒等变形
(1).已知x²+y²+z²-2x+4y-6z+14=0,求(x-y-z)^2010
(2)设m、n满足m²n²+m²+n²+10mn+16=0,求m+n的值
(3)已知14(a²+b²+c²)=(a+2b+3c)² 求证a:b:c=1:2:3
(4)已知实数x、y、z满足x+y=5 z²=xy+y-9,求x+2y+3z

代数式的恒等变形(1).已知x²+y²+z²-2x+4y-6z+14=0,求(x-y-z)^2010(2)设m、n满足m²n²+m²+n²+10mn+16=0,求m+n的值(3)已知14(a²+b²+c²)=(a+2b+3c)² 求证a:b:c=1:2:3(4)已知实
1) 原式左边 = x² - 2x +1 +y²+4y +4 + z²-6z +9 = (x-1)² + (y+2)² + (z-3)² = 0
于是 x=1 y=-2 z=3,x-y-z = 0
(x-y-z)^2010 = 0
2) 原式左边 = m²n²+m²+n²+2mn +8mn+16 = m²n²+8mn+16 + m²+n²+2mn
= (mn+4)² + (m+n)² = 0
于是 mn=-4,m+n=0
3) 14(a²+b²+c²)=(a+2b+3c)²
14a² + 14b² + 14c² = a² +4b² +9c² +4ab + 6ac + 12bc
右边移到左边得到
13a² + 10b² + 5c² -4ab -6ac -12bc = 0
配方:
(4a² -4ab +b²) + (9a²-6ac+c²) + (9b² -12bc+4c²) = 0
(2a-b)² + (3a-c)² + (3b-2c)²= 0
于是 2a-b=0 3a-c=0 3b-2c=0 解得 b=2a c=3a 于是 a:b:c=1:2:3
4) x+y=5 (1)
z²=xy+y-9 (2)
(1)式得到 x=5-y 代入(2)式
z² = (5-y)y+y-9
z² =5y-y²+y-9 右边移到左边 合并得到
y²-6y+9 +z² = 0
(y-3)²+z²= 0
于是 y=3,z=0 x=5-y=2 则x+2y+3z = 8

∵x2+y2+z2-2x+4y-6z+14=0,
∴x2-2x+1+y2+4y+4+z2-6z+9=0,
(x-1)2+(y+2)2+(z-3)2=0,
∴x-1=0,y+2=0,z-3=0,
解得x=1,y=-2,z=3,
∴(x-y-z)2010=0.
∵m2n2+m2+n2+10mn+16=0,
∴(m2n2+8mn+16)+(m2+2...

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∵x2+y2+z2-2x+4y-6z+14=0,
∴x2-2x+1+y2+4y+4+z2-6z+9=0,
(x-1)2+(y+2)2+(z-3)2=0,
∴x-1=0,y+2=0,z-3=0,
解得x=1,y=-2,z=3,
∴(x-y-z)2010=0.
∵m2n2+m2+n2+10mn+16=0,
∴(m2n2+8mn+16)+(m2+2mn+n2)=0,
∴(mn+4)2+(m+n)2=0,
又∵(mn+4)2≥0,(m+n)2≥0,
∴(mn+4)2=0,(m+n)2=0,

mn+4=0,m+n=0
14(a^2+b^2+c^2)=(a+2b+3c)^2
14a^2+14b^2+14c^2=a^2+4b^2+9c^2+4ab+6ac+12bc
13a^2+10b^2+5c^2-4ab-6ac-12bc=0
4a^2-4ab+b^2+9b^2-12bc+4c^2+9a^2-6ac+c^2=0
(2a-b)^2+(3b-2c)^2+(3a-c)^2=0,即
2a-b=0
3b-2c=0
3a-c=0
所以a:b:c=a:2a:3a=1:2:3
首先转化一下:x=5-y
把x代入z²=xy+y-9;得到z²=y(5-y)+y-9=5y-y²+y-9
变化一下得到:z²+(y-3)²=0;
要使平方数等于0 则z=0 ; y=3;因为x=5-y
所以x=2;所以x+2y+3z=8

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1、 x²+y²+z²-2x+4y-6z+14=0
x²-2x+1+y²+4y+4+z²-6z+9=0
(x-1)²+(y+2)²+(z-3)²=0
所以x=1,y=-2,z=3
x-y-z=0
(x-y-...

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1、 x²+y²+z²-2x+4y-6z+14=0
x²-2x+1+y²+4y+4+z²-6z+9=0
(x-1)²+(y+2)²+(z-3)²=0
所以x=1,y=-2,z=3
x-y-z=0
(x-y-z)^2010=0

2、m²n²+m²+n²+10mn+16=0
m²+n²+2mn+m²n²+8mn+16=0
(m+n)²+(mn+4)²=0
m+n=0,mn=-4

3、14(a²+b²+c²)=(a+2b+3c)²
14(a²+b²+c²)=a²+4b²+9c²+4ab+6ac+12bc
13a²+10b²+5c²-4ab-6ac-12bc=0
4a²-4ab+b²+9a²-6ac+c²+9b²-12bc+4c²=0
(2a-b)²+(3a-c)²+(3b-2c)²=0
所以:2a=b,3a=c,3b=2c
所以:a:b:c=1:2:3

4、x+y=5,则x=5-y
代入z²=xy+y-9
z²=(5-y)y+y-9
z²=6y-y²-9
z²= -(y-3)²
所以z=0,y=3
则x=5-y=2
所以x+2y+3z=2+6=8

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