جد ناتج كل مما يأتي بالصيغة الجبرية للعدد المركب:

$(1+2i)(2+3i)$

$(1+2i)(2+3i)=2+3i+4i+6i^2=(2-6)+(3+4)i=-4+7i$

ضرب الأعداد المركبة

ضرب الأعداد المركبة

إذا كان ${\mathrm{C}}_1=(a+bi) , {\mathrm{C}}_2=(c+di)\mathrm{\forall }c , h\in R$ فإن:

$$\begin{gathered} \text{1) }h(a+bi)=ah+hbi \\ \text{2) }hi(a+bi)=hai+hb{i}^2=hai-hb=-hb+hai \\ \text{3) }{\mathrm{C}}_1\cdot {\mathrm{C}}_2=(a+bi)(c+di)=ac+adi+bci+bd{i}^2=(ac-bd)+(ad+bc)i \\ \text{4) }(a+bi{)}^2=a^2+2abi+b^2{i}^2=(a^2-b^2)+2abi \\ \text{5) }\mathrm{\forall }c\ne 0+0i\mathrm{\exists }{c}^{-1}=\frac{1}{c} \end{gathered}$$

ملاحظة: يوجد النظير الضربي لكل عدد مركب ما عدا الصفر لا يوجد نظير ضربي.

(1)- جد ناتج كل مما يأتي بالصيغة الجبرية للعدد المركب:

$3(1-6i)$

$3(1-6i)=3-18i$

$3i(1-6i)$

$3i(1-6i)=3i-18i^2=3i+18=18+3i$

$(1+2i)(2+3i)$

$(1+2i)(2+3i)=2+3i+4i+6i^2=(2-6)+(3+4)i=-4+7i$

$(2-3i)(4-i)$

$(2-3i)(4-i)=8-2i-12i+3i^2=(8-3)+(-2-12)i=5-14i$

$(2i^2+3i^3)(\sqrt{-4}+5)$

$\begin{array}{rl}(2i^2+3i^3)(\sqrt{-4}+5)& =(-2-3i)(2i+5)=(-2-3i)(5+2i)\\ & =-10-4i-15i-6i^2\\ & =(-10+6)-4i-15i=-4-19i\end{array}$

$(1-2i{)}^2$

$(1-2i{)}^2=1-4i+4i^2=1-4i-4=-3-4i$

$(-2+3i{)}^2$

$(-2+3i{)}^2=4-12i+9i^2=4-12i-9=-5-12i$

$(1+2i{)}^3$

$\begin{array}{rl}(1+2i{)}^3& =(1+2i)(1+2i{)}^2=(1+2i)(1+4i+4i^2)=(1+2i\left)\right(1+4i-4)\\ & =(1+2i)(-3+4i)=-3+4i-6i+8i^2\\ & =(-3-8)+(4i-6i)=-11-2i\end{array}$

$(2-i{)}^4$

$(2-i{)}^4={\left[\right(2-i{)}^2]}^2={(4-4i+i^2)}^2=(3-4i{)}^2=9-24i+16i^2=-7-24i$

$(1-\sqrt{3}i{)}^2+(2-2\sqrt{3}i{)}^2$

$\begin{array}{rl}(1-\sqrt{3}i{)}^2+(2-2\sqrt{3}i{)}^2& =(1-2\sqrt{3}i+3i^2)+(4-8\sqrt{3}i+12i^2)\\ & =(1-2\sqrt{3}i-3)+(4-8\sqrt{3}i-12)\\ & =(-2-2\sqrt{3}i)+(-8-8\sqrt{3}i)=-10-10\sqrt{3}i\end{array}$

$(1+i{)}^2-(3-i\left)\right(1+2i)$

$\begin{array}{rl}& (1+i{)}^2-(3-i\left)\right(1+2i)=(1+2i+i^2)-(3+6i-i-2i^2)\\ & =(0+2i)-(3+2)+(6-1)i=(0+2i)-(5+5i)\\ & =(0+2i)+(-5-5i)=-5-3i\end{array}$

$(1+i{)}^3-(1-i{)}^3$

$\begin{array}{rl}& (1+i{)}^3-(1-i{)}^3=(1+i{)}^2(1+i)-(1-i{)}^2(1-i)\\ & =(1+2i+i^2)(1+i)-(1-2i+i^2)(1-i)=2i(1+i)-[-2i(1-i\left)\right]\\ & =(2i+2i^2)-(-2i+2i^2)=(-2+2i)-(-2-2i)=(-2+2i)+(2+2i)=0+4i\end{array}$

إذا كانت $x=2+3i$ فجد قيمة $x^2-3xi+\sqrt{-16}$

$\begin{array}{rl}& x^2-3xi+\sqrt{-16}=(2+3i{)}^2-3(2+3i)i+4i\\ & =(4+12i+9i^2)+(-6i-9i^2)+(0+4i)\\ & =(-5+12i)+(9-6i)+(0+4i)=4+10i\end{array}$

$(1+i{)}^2+(1-i{)}^2$

$\begin{array}{rl}(1+i{)}^2+(1-i{)}^2& =(1+2i+i^2)+(1-2i+i^2)\\ & =(1+2i-1)+(1-2i-1)=2i-2i=0\end{array}$