2个回答
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设A点坐标(x1,y1),B点坐标(x2,y2)
将x+y=1代入mx²+ny²=1,得(m+n)x²-2nx+n-1=0,(易知m,n>0)
根据韦达定理有
x1+x2=2n/(m+n),x1x2=(n-1)/(m+n)
故y1+y2=2-(x1+x2)=2m/(m+n)
AB=√[(x1-x2)²+(y1-y2)²]=√[(x1-x2)²+(1-x1-1+x2)²]
=√[2(x1-x2)²]=√{2[(x1+x2)²-4x1x2]}
=√{2[4n²/(m+n)²-4(n-1)/(m+n)]}
=√[8(m-mn+n)/(m+n)²]=2√2
变形得m-mn+n=(m+n)²
C点坐标为((x1+x2)/2,(y1+y2)/2)
故[(y1+y2)/2]/[(x1+x2)/2]=(y1+y2)/(x1+x2)=m/n=√2/2
即m=(√2/2)n,代入m-mn+n=(m+n)²得
(√2/2)n-(√2/2)n²+n=[(√2/2)n+n]²
(√2+2)(√2-1)=3n
n=√2/3
m=1/3
故椭圆方程为(1/3)x²+(√2/3)y²=1
将x+y=1代入mx²+ny²=1,得(m+n)x²-2nx+n-1=0,(易知m,n>0)
根据韦达定理有
x1+x2=2n/(m+n),x1x2=(n-1)/(m+n)
故y1+y2=2-(x1+x2)=2m/(m+n)
AB=√[(x1-x2)²+(y1-y2)²]=√[(x1-x2)²+(1-x1-1+x2)²]
=√[2(x1-x2)²]=√{2[(x1+x2)²-4x1x2]}
=√{2[4n²/(m+n)²-4(n-1)/(m+n)]}
=√[8(m-mn+n)/(m+n)²]=2√2
变形得m-mn+n=(m+n)²
C点坐标为((x1+x2)/2,(y1+y2)/2)
故[(y1+y2)/2]/[(x1+x2)/2]=(y1+y2)/(x1+x2)=m/n=√2/2
即m=(√2/2)n,代入m-mn+n=(m+n)²得
(√2/2)n-(√2/2)n²+n=[(√2/2)n+n]²
(√2+2)(√2-1)=3n
n=√2/3
m=1/3
故椭圆方程为(1/3)x²+(√2/3)y²=1
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解:
设A(x1,y1),B(x2,y2)
mx2+ny2=1…………①
x+y=1………………②
联立①②得:
(m+n)x²-2nx+n-1=0
则:x1+x2=2n/(m+n),x1x2=(n-1)/(m+n)
又AB=√2|x1-x2|=√2×√[(x1+x2)²-4x1x2]
√2×√[(2n/(m+n))²-4(n-1)/(m+n)]=2√2
整理得:m²+n²+3mn-m-n=0………………………………③
AB中点横坐标为(x1+x2)/2=n/(m+n),
y1=1-x1,y2=1-x2
(y1+y2)/2=(2-x1-x2)/2=1-(x1+x2)/2=1-n/(m+n),
AB的中点C与椭圆中心连线的斜率为√2/2,即:(y1+y2)/(x1+x2)=2√2
也即:m=2√2n……………………………………………④
联立③④解得:m=(32+2√2)/9,n=(8√2+1)/9
设A(x1,y1),B(x2,y2)
mx2+ny2=1…………①
x+y=1………………②
联立①②得:
(m+n)x²-2nx+n-1=0
则:x1+x2=2n/(m+n),x1x2=(n-1)/(m+n)
又AB=√2|x1-x2|=√2×√[(x1+x2)²-4x1x2]
√2×√[(2n/(m+n))²-4(n-1)/(m+n)]=2√2
整理得:m²+n²+3mn-m-n=0………………………………③
AB中点横坐标为(x1+x2)/2=n/(m+n),
y1=1-x1,y2=1-x2
(y1+y2)/2=(2-x1-x2)/2=1-(x1+x2)/2=1-n/(m+n),
AB的中点C与椭圆中心连线的斜率为√2/2,即:(y1+y2)/(x1+x2)=2√2
也即:m=2√2n……………………………………………④
联立③④解得:m=(32+2√2)/9,n=(8√2+1)/9
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