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信息发布者:
解:​​$x(x - 4)=0$​​
​​$x = 0$​​或​​$x - 4 = 0$​​
​​$x_{1} = 0,$​​​​$x_{2} = 4$​​
解:​​$(2y + 1)(y - 2)=0$​​
​​$2y + 1 = 0$​​或​​$y - 2 = 0$​​
​​$y_{1} = -\frac {1}{2},$​​​​$y_{2} = 2$​​
解:​​$2(x - 4)+x(x - 4)=0$​​
​​$(x - 4)(2 + x)=0$​​
​​$ x - 4 = 0$​​或​​$2 + x = 0$​​
​​$x_{1} = 4,$​​​​$x_{2} = - 2$​​
解:​​$4x(5x - 2)=3(5x - 2)$​​
​​$(5x - 2)(4x - 3)=0$​​
​​$5x - 2 = 0$​​或​​$4x - 3 = 0$​​
​​$x_{1}=\frac {2}{5},$​​​​$x_{2}=\frac {3}{4}$​​
解:由​$x^2 - 49 = 0$​得​$x^2=49,$
所以​$x=\pm\sqrt{49}=\pm7,$
​即​$x_1 = 7,$​​$x_2 = - 7。$
解:由​$(x + 1)^2 - 25 = 0$​得​$(x + 1)^2=25,$
则​$x + 1=\pm\sqrt{25}=\pm5。$
当​$x + 1 = 5$​时,解得​$x_1 = 4;$
当​$x + 1 = - 5$​时,解得​$x_2 = - 6。$
解:​​$\frac {1}{2}(x - 2)^2 - 8 = 0$​​
​​$(x - 2)^2 = 16$​​
​​$ x - 2=\pm \sqrt {16}=\pm 4$​​
​​$ $​​当​​$x - 2 = 4$​​时,解得​​$x_{1} = 6$​​
​​$ $​​当​​$x - 2 = - 4$​​时,解得​​$x_{2} = - 2$​​
解:​​$(2x - 1)^2 - x^2 = 0$​​
​​$(2x - 1 + x)(2x - 1 - x)=0$​​
​​$(3x - 1)(x - 1)=0$​​
​​$x_{1}=\frac {1}{3},$​​​​$x_{2} = 1$​​
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