16.(1)已知復(fù)數(shù)z滿足:|z|=1+3i-z,求$\frac{{{{(1+i)}^2}{{(3+4i)}^2}}}{2z}$的值.
(2)已知函數(shù)y=(x+1)(x+2)(x+3).求該函數(shù)的導(dǎo)函數(shù).
(3)求不等式-1<x2+2x-1≤2的解集.
分析 (1)利用復(fù)數(shù)的運(yùn)算法則�����、模的計(jì)算公式、復(fù)數(shù)相等即可得出��;
(2)展開利用導(dǎo)數(shù)的運(yùn)算法則即可得出�;
(3)利用一元二次不等式的解法、交集的運(yùn)算性質(zhì)即可得出.
解答 解:(1)設(shè)z=a+bi���,(a����,b∈R),而|z|=1+3i-z��,即$\sqrt{{a^2}+{b^2}}-1-3i+a+bi=0$,
則$\left\{\begin{array}{l}\sqrt{{a^2}+{b^2}}+a-1=0\\ b-3=0\end{array}\right.⇒\left\{\begin{array}{l}a=-4\\ b=3\end{array}\right.�,z=-4+3i$���,
$\frac{{{{(1+i)}^2}{{(3+4i)}^2}}}{2z}=\frac{2i(-7+24i)}{2(-4+3i)}=\frac{24+7i}{4-i}=3+4i$.
(2)y=(x2+3x+2)(x+3)=x3+6x2+11x+6�����,
∴y′=3x2+12x+11.
(3)∵$\left\{\begin{array}{l}{{x}^{2}+2x-3≤0}\\{{x}^{2}+2x>0}\end{array}\right.$����,
∴-3≤x<-2或0<x≤1.
∴不等式的解集{x|-3≤x<-2或0<x≤1}.
點(diǎn)評(píng) 本題考查了復(fù)數(shù)的運(yùn)算法則�、模的計(jì)算公式、復(fù)數(shù)相等���、導(dǎo)數(shù)的運(yùn)算法則、一元二次不等式的解法、交集的運(yùn)算性質(zhì)��,考查了推理能力與計(jì)算能力,屬于中檔題.
