关于、、、、【实数】的一些问题额、 帮帮忙、 好的加分、
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\u56e0\u4e3a\u221a3=1.732 \u6240\u4ee5\u539f\u5f0f=8.464
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4xy=b x+y=a
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a²-4ab+4b²-2a+4b=(a-2b)²-2(a-2b)=-1
2. a、b、c为△ABC的三边,有b+c>a
(b+c)²>a², 所以b²+c²-a²+2bc>0
3. 2^48-1=(2^6-1)(2^6+1)(2^12+1)(2^24+1)=63*65*(2^12+1)(2^24+1)
所以这两个数是63,65
4. 25(a-b)²-(a+b)²=(4a-6b)(6a-4b)=4(2a-3b)(3a-2b)
5.a²(x-y)+b²(y-x)=(x-y)(a²-b²)=(x-y)(a+b)(a-b)
6.πa²- πb²
7.5y²-15y+5=5(y²-3y+1)
=5[y-(3-√5)/2][y-(3+√5)/2](在实数范围内分解)
8.x(m-x)(m-y)-m(x-m)(y-m)=(m-x)(m-y)(x-m)=-(m-x)²(m-y)
9.-27m²n+9mn²-18mn=9mn(-3m+n-2)
10.(3x+1)²=9x²+1+6x,所以单项式可以是6x
11.a=b=c
12.(x+1/x)²=x²+1/x²+2
(1) x²+1/x²=14
(2)(x-1/x)²=x²+1/x²-2=12
13.化简得-3x²=-12
14.5x²+5x-15-24x-4x²-x²+4x=-15x-15=-15(x+1)
1.由a(a+1)-(a²+2b)=1,化简可得a-2b=1,a²-4ab+4b²-2a+4b=(a-2b)²-2(a-2b)=1-2=-1
2.∵a、b、c为△ABC的三边,∴b+c>a,∴(b+c)²>a² 展开移项得b²+c²-a²+2bc>0
3.2^48-1=(2^24+1)×(2^24-1)=(2^24+1)×(2^12+1)×(2^12-1)=(2^24+1)×(2^12+1)×(2^6+1)(2^6-1)=(2^24+1)×(2^12+1)×65×63
所以这两个数是65和63
4.25(a-b)²-(a+b)²=(a+b)(25a-25b-a-b)=(a+b)(24a-26b)=2(a+b)(12a-13b)
5.a²(x-y)+b²(y-x)=(x-y)(a²-b²)=(x-y)(a+b)(a-b)
6.题目看的不是很明白,大概是π(a+b)(a-b)
7.5y²-15y+5=5(y^2-3y+1)(在有理数范围内分解)
=5[y-(3-√5)/2][y-(3+√5)/2](在实数范围内分解)
8.x(m-x)(m-y)-m(x-m)(y-m)=(m-x)(m-y)(x-m)=-(m-x)²(m-y)
9.-27m²n+9mn²-18mn=-9mn(3m-n+2)
10.6x
11.a=b=c
12.(1)14 (2)12
13.x²(2x)³-x(3x+8x的四次方)=x²(8x³+3)=4x(8x8+3)=268
14.5(x²+x-3)-4x(6+x)+x(-x+4)=-15x-15=-15(x+1)
绛旓細1. a(a+1)-(a²+2b)=1,寰楀嚭a-2b=1 a²-4ab+4b²-2a+4b=(a-2b)²-2(a-2b)=-1 2. a銆乥銆乧涓衡柍ABC鐨勪笁杈,鏈塨+c>a (b+c)²>a², 鎵浠²+c²-a²+2bc锛0 3. 2^48-1=(2^6-1)(2^6+1)(2^12+1)(2^24+1)=63...
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