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信息发布者:
解:​$\frac {x^2 - 9}{9 - 6x + x^2}$​
​$=\frac {(x - 3)(x + 3)}{(x - 3)^2}$​
​$=\frac {x + 3}{x - 3}$​
解:​$\frac {4 - 8b}{4b^2 - 1}$​
​$=\frac {4(1 - 2b)}{(2b - 1)(2b + 1)}$​
​$=\frac {-4(2b - 1)}{(2b - 1)(2b + 1)}$​
​$=-\frac {4}{2b + 1}$​
解:​$\frac {x^2 - 3xy}{x^2 - 6xy + 9y^2}=\frac {x(x - 3y)}{(x - 3y)^2}=\frac {x}{x - 3y},$​
当​$x = -1,$​​$y = \frac {2}{3}$​时,​$x - 3y=-1 - 3×\frac {2}{3}=-1 - 2=-3,$​
原式​$=\frac {-1}{-3}=\frac {1}{3}$​
​$ $​解​$:(1)$​不正确,改正:
​$\frac {a^2 - 2ab + b^2}{b - a}$​
​$=\frac {(a - b)^2}{-(a - b)}$​
​$=-(a - b)=b - a$​
​$ $​解​$:(2)$​不正确,改正:
​$\frac {\mathrm {m^2} - 2m + 1}{m - 1}+\frac {4 -\mathrm {m^2}}{m + 2}$​
​$=\frac {(m - 1)^2}{m - 1}+\frac {(2 - m)(2 + m)}{m + 2}$​
​$=m - 1 + (2 - m)$​
​$=1$​
解:由​$b - \frac {1}{2}a^2 = 0$​得​$b=\frac {1}{2}a^2,$​
则​$\frac {3ab + 3b}{a^2 + b}$​
​$=\frac {3b(a + 1)}{a^2 + b}$​
​$=\frac {3×\frac {1}{2}a^2(a + 1)}{a^2 + \frac {1}{2}a^2}$​
​$=\frac {\frac {3}{2}a^2(a + 1)}{\frac {3}{2}a^2}$​
​$=a + 1$​
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