أثبت أن:

$(1-\frac{2}{{\omega }^2}+{\omega }^2)(1+\omega -\frac{5}{\omega })=18$

$\begin{array}{rl}\mathbf{LHS}\mathbf{:}& (1-\frac{2}{{\omega }^2}+{\omega }^2)(1+\omega -\frac{5}{\omega })=(1-\frac{2{\omega }^3}{{\omega }^2}+{\omega }^2)(1+\omega -\frac{5{\omega }^3}{\omega })\\ & =(1-2\omega +{\omega }^2)(1+\omega -5{\omega }^2)=(1-2\omega +(-1-\omega \left)\right)(-{\omega }^2-5{\omega }^2)\\ & =(-3\omega )(-6{\omega }^2)=18{\omega }^3=18 \mathbf{:}\mathbf{RHS}\end{array}$

تمارين (3-1)

(1)- أكتب المقادير الآتية بأبسط صورة:

${\omega }^{64}$

${\omega }^{64}={\left({\omega }^3\right)}^{21}\cdot \omega =1\cdot \omega =\omega$

${\omega }^{-325}$

${\omega }^{-325}=\frac{1}{{\omega }^{325}}=\frac{1}{{\left({\omega }^3\right)}^{108}\cdot \omega }=\frac{1}{\omega }=\frac{{\omega }^3}{\omega }={\omega }^2$

$\frac{1}{{(1+{\omega }^{-32})}^{12}}$

$\frac{1}{{(1+{\omega }^{-32})}^{12}}=\frac{1}{{(1+{\omega }^{-32}\cdot {\omega }^{33})}^{12}}=\frac{1}{(1+\omega {)}^{12}}=\frac{1}{{(-{\omega }^2)}^{12}}=\frac{1}{{\omega }^{24}}=\frac{1}{{\left({\omega }^3\right)}^8}=\frac{1}{(1{)}^8}=1$

${(1+{\omega }^2)}^{-4}$

${(1+{\omega }^2)}^{-4}=\frac{1}{{(1+{\omega }^2)}^4}=\frac{1}{(-\omega {)}^4}=\frac{1}{{\omega }^4}=\frac{1}{{\omega }^3\cdot \omega }=\frac{1}{\omega }=\frac{{\omega }^3}{\omega }={\omega }^2$

${\omega }^{9n+5}$

${\omega }^{9n+5}={\omega }^{9n}\cdot {\omega }^5={\left({\omega }^3\right)}^{3n}\cdot {\omega }^5=\left(1\right){\omega }^2={\omega }^2$

(2)- كون المعادلة التربيعية التي جذراها:

$1+\omega ,1+{\omega }^2$

$\begin{array}{rl}& (1+\omega )+(1+{\omega }^2)=2+\omega +{\omega }^2=2-1=1 \mathrm{الجذرين} \mathrm{مجموع}\\ & (1+\omega )(1+{\omega }^2)=1+\omega +{\omega }^2+{\omega }^3=1-1+1=1 \mathrm{الضرب} \mathrm{حاصل}\\ & x^2-(\mathrm{الجذرين} \mathrm{مجموع})x+\mathrm{الجذرين} \mathrm{ضرب} \mathrm{حاصل}=0\\ & x^2-x+1=0 \mathrm{التربيعية} \mathrm{المعادلة}\end{array}$

$\frac{\omega }{2-{\omega }^2},\frac{{\omega }^2}{2-\omega }$

$\begin{array}{rl}& \frac{\omega }{2-{\omega }^2}+\frac{{\omega }^2}{2-\omega }=\frac{\omega (2-\omega )+{\omega }^2(2-{\omega }^2)}{(2-{\omega }^2)(2-\omega )} \mathrm{الجذرين} \mathrm{مجموع}\\ & =\frac{2\omega -{\omega }^2+2{\omega }^2-{\omega }^4}{4-2\omega -2{\omega }^2+{\omega }^3}=\frac{2\omega +{\omega }^2-\omega }{5-2(\omega +{\omega }^2)}=\frac{\omega +{\omega }^2}{5-2(-1)}=\frac{-1}{7}\\ & \frac{\omega }{2-{\omega }^2}\times \frac{{\omega }^2}{2-\omega }=\frac{{\omega }^3}{(2-{\omega }^2)(2-\omega )}=\frac{1}{7} \mathrm{الضرب} \mathrm{حاصل}\\ & x^2-(\mathrm{الجذرين} \mathrm{مجموع})x+\mathrm{الجذرين} \mathrm{ضرب} \mathrm{حاصل}=0\\ & \therefore x^2+\frac{1}{7}x+\frac{1}{7}=0 \mathrm{التربيعية} \mathrm{المعادلة}\end{array}$

$\frac{3i}{{\omega }^2},\frac{-3{\omega }^2}{i}$

$$\begin{gathered} \begin{array}{rl}& \frac{3i}{{\omega }^2}+\frac{-3{\omega }^2}{i}=\frac{3i}{{\omega }^2}{\omega }^3+\frac{-3{\omega }^2}{i}\left(\frac{-i}{-i}\right)=3\omega i+3{\omega }^{2}i=3i(\omega +{\omega }^2)=3i(-1)=-3i\\ & \frac{3i}{{\omega }^2}\times \frac{-3{\omega }^2}{i}=\frac{3i}{{\omega }^2}{\omega }^3\times \frac{-3{\omega }^2}{i}\left(\frac{-i}{-i}\right)=3\omega i\times 3{\omega }^{2}i=9{\omega }^3{i}^2=-9\end{array} \\ \begin{array}{rl}& x^2-(\mathrm{الجذرين} \mathrm{مجموع})x+\mathrm{الجذرين} \mathrm{ضرب} \mathrm{حاصل}=0\\ & \therefore x^2-(-3i)x+(-9)=0\Rightarrow x^2+3ix-9=0 \mathrm{التربيعية} \mathrm{المعادلة}\end{array} \end{gathered}$$

(3)- إذا كان $z^2+z+1=0$ فجد قيمة: $\frac{1+3z^{10}+3z^{11}}{1-3z^7-3z^8}$

الطريقة الأولى:

$\begin{array}{rl}& z^2+z+1=0\\ & z^2+z+{\omega }^3=0\\ & (z-\omega )(z-{\omega }^2)=0\\ & \text{either }z=\omega \\ & \text{or}z={\omega }^2\end{array}$

الطريقة الثانية: يحل بالدستور

$$\begin{gathered} z^2+z+1=0 \mathrm{بالدستور} a=1,b=1,c=1 \\ \begin{array}{rl}& Z=\frac{-b\pm \sqrt{b^2-4ac}}{2a}=\frac{-\left(1\right)\pm \sqrt{(1{)}^2-(4\left)\right(1\left)\right(1)}}{2\left(1\right)}\\ & Z=\frac{-1\pm \sqrt{1-4}}{2}=\frac{-1\pm \sqrt{-3}}{2}\end{array} \\ Z=\frac{-1\pm \sqrt{3}i}{2}=\frac{-1}{2}\pm \frac{\sqrt{3}}{2}i \\ either z=\frac{{\displaystyle -1}}{{\displaystyle 2}}+\frac{{\displaystyle \sqrt{3}}}{{\displaystyle 2}}i=\omega \mathrm{الأول} \mathrm{الجذر} \\ or z=\frac{-1}{2}-\frac{\sqrt{3}}{2}i={\omega }^2 \mathrm{الثاني} \mathrm{الجذر} \\ \frac{1+3{\omega }^{10}+3{\omega }^{11}}{1-3{\omega }^7-3{\omega }^8}=\frac{1+3{\left({\omega }^3\right)}^3\omega +3{\left({\omega }^3\right)}^3\cdot {\omega }^2}{1-3{\left({\omega }^3\right)}^2\omega -3{\left({\omega }^3\right)}^2\cdot {\omega }^2}=\frac{1+3\omega +3{\omega }^2}{1-3\omega -3{\omega }^2}=\frac{1+3(\omega +{\omega }^2)}{1-3(\omega +{\omega }^2)}=\frac{1-3}{1-3(-1)}=\frac{-2}{4}=-\frac{1}{2} \left(z=\omega \right) \\ =\frac{1+3{\left({\omega }^2\right)}^{10}+3{\left({\omega }^2\right)}^{11}}{1-3{\left({\omega }^2\right)}^7-3{\left({\omega }^2\right)}^8}=\frac{1+3{\omega }^{20}+3{\omega }^{22}}{1-3{\omega }^{14}-3{\omega }^{16}}=\frac{1+3{\omega }^2+3\omega }{1-3{\omega }^2-3\omega } \left(z={\omega }^2\right) \\ =\frac{1+3({\omega }^2+\omega )}{1-3({\omega }^2+\omega )}=\frac{1-3}{1+3}=\frac{-2}{4}=-\frac{1}{2} \end{gathered}$$

(4)- أثبت أن:

${(\frac{1}{2+\omega }-\frac{1}{2+{\omega }^2})}^2=\frac{-1}{3}$

$\begin{array}{rl}\mathbf{\text{LHS:}}& {(\frac{1}{2+\omega }-\frac{1}{2+{\omega }^2})}^2={\left(\frac{2+{\omega }^2-(2+\omega )}{(2+\omega )(2+{\omega }^2)}\right)}^2\\ & ={\left(\frac{2+{\omega }^2-2-\omega }{4+2{\omega }^2+2\omega +{\omega }^3}\right)}^2={\left(\frac{{\omega }^2-\omega }{5-2({\omega }^2+\omega )}\right)}^2=\frac{{({\omega }^2-\omega )}^2}{(5-2{)}^2}\\ & =\frac{{\omega }^4-2{\omega }^3+{\omega }^2}{3^2}=\frac{\omega +{\omega }^2-2}{9}=\frac{-1-2}{9}=\frac{-3}{9}=\frac{-1}{3} \mathbf{:}\mathbf{R}\mathbf{\text{HS}}\end{array}$

$\frac{{\omega }^{14}+{\omega }^7-1}{{\omega }^{10}+{\omega }^5-2}=\frac{2}{3}$

$\begin{array}{rl}\mathbf{LHS}\mathbf{:}& \frac{{\omega }^{14}+{\omega }^7-1}{{\omega }^{10}+{\omega }^5-2}=\frac{{\left({\omega }^3\right)}^4\cdot {\omega }^2+{\left({\omega }^3\right)}^2\omega -1}{{\left({\omega }^3\right)}^3\omega +{\omega }^3{\omega }^2-2}=\frac{{\omega }^2+\omega -1}{\omega +{\omega }^2-2}=\frac{-1-1}{-1-2}\\ & =\frac{-2}{-3}=\frac{2}{3}\mathbf{:}\mathbf{RHS}\end{array}$

$(1-\frac{2}{{\omega }^2}+{\omega }^2)(1+\omega -\frac{5}{\omega })=18$

$\begin{array}{rl}\mathbf{LHS}\mathbf{:}& (1-\frac{2}{{\omega }^2}+{\omega }^2)(1+\omega -\frac{5}{\omega })=(1-\frac{2{\omega }^3}{{\omega }^2}+{\omega }^2)(1+\omega -\frac{5{\omega }^3}{\omega })\\ & =(1-2\omega +{\omega }^2)(1+\omega -5{\omega }^2)=(1-2\omega +(-1-\omega \left)\right)(-{\omega }^2-5{\omega }^2)\\ & =(-3\omega )(-6{\omega }^2)=18{\omega }^3=18 \mathbf{:}\mathbf{RHS}\end{array}$

${(1+{\omega }^2)}^3+(1+\omega {)}^3=-2$

$\mathbf{LHS}\mathbf{:}{(1+{\omega }^2)}^3+(1+\omega {)}^3=(-\omega {)}^3+{(-{\omega }^2)}^3=-{\omega }^3-{\omega }^6=-1-1=-2 \mathbf{:}\mathbf{RHS}$