tx²-6x+3t=0 не имеет корней,если Д<0(дискриминант)
1.149. ((x+3)/(x²-3x)+(x-3)/(x²+3x))·(9x-x³)/(x²+9)=
=((x+3)/x(x-3)+(x-3)/x(x+3))·x(9-x²)/(x²+9)=[((x+3)²+(x-3)²)/x(x²-9)]·x(9-x²)/(x²+9)=
=(x²+6x+9+x²-6x+9)·x·(9-x²)/(x(x²-9)·(x²+9)=(2·(x²+9)·x(9-x²))/(x·(x²-9)·(x²+9))=-2;
1.150 [(x+3)/(x-3)-(x-3)/(x+3)]:2x/(9-x²)=((x+3)²-(x-3)²)/(x²-9):2x/(9-x²)=
=(x²+6x+9-x²+6x-9)·(9-x²)/(2x·(x²-9))=(12x(9-x²)/2x(x²-9)=-6;
1.151 2a/(a+1)+(3/(a-1)²-3/(a²-1)):3/(a²-2a+1)=
=2a/(a+1)+[(3·(a+1)-3(a-1))/(a-1)²(a+1)]:3/(a-1)²=
=2a/(a+1)+(3a+3-3a+3)·(a-1)²/[3(a-1)²·(a+1)]=2a/(a+1)+6/3(a+1)=(2a+2)/(a+1)=2;
1+8х+16х²=0
(1+4х)²=0
1+4х=0
4х=-1
х=-0.25
2 способ
D=0
x=(-8+0):32=-1/4=0,25
x5 + y5 = (x + y) (x4 – x3y + x2y2 – xy3 + y4)
Следовательно x^5+y^5 на x+y = x^4 – x^3y + x^2y^2 – xy^3 + y^4)
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