<span><span>((3x-1)е^х)' = (3x-1)'е^х+ (3x-1)(е^х)' = 3*e^x+(3x-1)*e^x = (3x+2)*e^x
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A)
(b-a)/a²b + (3a+b)/ab² - (3a²-4b²)/a²b² =
= [b(b-a) + a(3a+b) - 3a² - 4b²] / a²b² =
= (b²-ab+3a²+ab-3a²-4b²) / a²b² =
=-3b²/a²b² = -3/a²
б)
x/(2(x-1)) - 3/(2x+2) +(x-2)/(x²-1) =
= [x(x+1) - 3(x-1) + 2(x-2)] / 2(x-1)(x+1) =
= (x²+x-3x+3+2x-4) / 2(x-1)(x+1) =
= (x²-1) / 2(x-1)(x+1) =
=(x-1)(x+1) / 2(x-1)(x+1) =1/2
1)y=xˇ3-xˇ2-x+1=xˇ2(x-1)-(x-1).1=(x-1)(xˇ2-1)=(x-1)(x+1)(x-1)
x1=1, x2=-1 y(1)y(-1)=0
2)y=8x4-125x= x(8xˇ3-125)=x((2x)ˇ3-5ˇ3)=x(2x-5)(4xˇ2+10x+25)
x1=0, x2=5/2
(4xˇ2 +10x+25 položitelnoe dlja x iz R)
3)y=2xˇ5+54xˇ2=2xˇ2(xˇ3+27)=2xˇ2(xˇ3+3ˇ3)=
=2xˇ2(x+3)(xˇ2-3x+9)
x1=0, x2=-3 (xˇ2-3x+9 položitelnoe dlja bcjakogo x iz R)