解虚系数一元二次方程x^2+(k-i)x+(k-0.5i)=0有实根,求实数K和方程的解请给详解
<p>问题:解虚系数一元二次方程x^2+(k-i)x+(k-0.5i)=0有实根,求实数K和方程的解请给详解<p>答案:↓↓↓<p class="nav-title mt10" style="border-top:1px solid #ccc;padding-top: 10px;">孙永香的回答:<div class="content-b">网友采纳 设实根为x0x0^2+(k-i)x0+(k-0.5i)=0(x0^2+kx0+k)-(x+0.5)i=0x0^2+kx0+k=0,x+0.5=0x0=-0.5k=-0.5将k=-0.5代入原方程得:x^2-(0.5+i)x-0.5(1+i)=0(x+0.5)(x-1-i)=0x=-0.5,或x=1+i
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