先化简,再求值,初三的
先化简,再求值,【1/(x-y)】-【1/(x+y)】/【xy²/(x²-y²)】,其中x=√2+1,y=√2-1...
先化简,再求值,【1/(x-y)】-【1/(x+y)】/【xy²/(x²-y²)】,其中x=√2+1,
y=√2-1 展开
y=√2-1 展开
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解答:由条件得:x-y=2,xy=﹙√2+1﹚﹙√2-1﹚=2-1=1,∴﹙xy﹚²=1,∴原式=1/﹙x-y﹚-[1/﹙x+y﹚]×[﹙x²-y²﹚/﹙xy²﹚]=1/﹙x-y﹚-[﹙x+y﹚﹙x-y﹚]/[﹙x+y﹚﹙xy²﹚]=1/﹙x-y﹚-x﹙x-y﹚/﹙xy﹚²=1/2-2﹙√2+1﹚=½-2√2-2=-3/2-2√2
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【1/(x-y)】-【1/(x+y)】/【xy²/(x²-y²)】
=,【1/(x-y)】-【1/(x+y)】×【(x²-y²)/xy²】,
=【(x+y)xy²-(x-y)(x²-y²)】/【(x-y)(x+y)xy²】
={(x+y)【xy²-(x-y)(x-y)】}/【(x-y)(x+y)xy²】
=【xy²-(x-y)(x-y)】/【(x-y)xy²】
x=√2+1,
y=√2-1
x-y=2 xy²=√2-1 所以)【xy²-(x-y)(x-y)】/【(x-y)xy²】=(√2-5)/(2√2-2)
=,【1/(x-y)】-【1/(x+y)】×【(x²-y²)/xy²】,
=【(x+y)xy²-(x-y)(x²-y²)】/【(x-y)(x+y)xy²】
={(x+y)【xy²-(x-y)(x-y)】}/【(x-y)(x+y)xy²】
=【xy²-(x-y)(x-y)】/【(x-y)xy²】
x=√2+1,
y=√2-1
x-y=2 xy²=√2-1 所以)【xy²-(x-y)(x-y)】/【(x-y)xy²】=(√2-5)/(2√2-2)
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上下乘(x²-y²):
{[1/(x-y)]-[1/(x+y)]}/[xy²/(x²-y²)]
=[(x+y)-(x-y)]/xy²
=2y/xy²
=2/xy
=2/(√2+1)(√2-1)
=2/(2-1)
=2
{[1/(x-y)]-[1/(x+y)]}/[xy²/(x²-y²)]
=[(x+y)-(x-y)]/xy²
=2y/xy²
=2/xy
=2/(√2+1)(√2-1)
=2/(2-1)
=2
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