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Question 1, Exercise 1.3

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plex coefficient. \begin{align}&z-4w=3i\\ &2z+3w=11-5i\end{align} ====Solution==== Given that \begin{align}z-4w&=3i …(i)\\ 2z+3w&=11-5i …(ii)\end{align} Multiply $2$ by (i), we get\\... s_{-}3w&=\mathop-\limits_{+}5i&\mathop+\limits_{-}11 \\ \hline 0&-11w&=11i &-11\\ \end{array} \] \begin{align}-11w&=11i-11\\ \implies w&=\dfrac{11-11i}{

Question 1, Exercise 1.1

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1 \right)\cdot i\cdot{{\left( {{i}^{2}} \right)}^{11}}\\ &=-i\cdot{{\left( {{i}^{2}} \right)}^{11}}\\ &=-i\cdot{{\left( -1 \right)}^{11}}\\ &=-i\cdot\left( -1 \right)\\ &=i\end{align} =====Question ... {-23}}\\ &=\frac{1}{i{{\left( {{i}^{2}} \right)}^{11}}}\\ &=\frac{1}{i{{\left( -1 \right)}^{11}}}\\ &=

Question 11, Exercise 1.1

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====== Question 11, Exercise 1.1 ====== Solutions of Question 11 of Exercise 1.1 of Unit 01: Complex Numbers. This is un... (KPTB or KPTBB) Peshawar, Pakistan. =====Question 11(i)===== Let ${{z}_{1}}=2-i$, ${{z}_{2}}=-2+i$. ... }_{1}}}} \right)=\dfrac{-2}{5}.$$ =====Question 11(ii)===== Let $z_1=2-i$. Find ${\rm Im}\left( \dfr

Question 5, Exercise 1.1

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uestion 5(i)===== Multiply the complex number $8i+11,-7+5i$. ====Solution==== \begin{align}&(8i+11)\times (-7+5i)\\ &=\left( 11+8i \right)\times \left( -7+5i \right)\\ &=\left( -77+40{{i}^{2}} \right)... =\left( -77-40 \right)+\left( 55-56 \right)i\\ &=-117-i\end{align} =====Question 5(ii)===== Multiply

Question 5, Exercise 1.3

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rac{-1\pm \sqrt{1-12}}{2}\\ z&=\dfrac{-1\pm \sqrt{11}}{2}i\\ z&=-\dfrac{1}{2}+\dfrac{\sqrt{11}}{2}i,-\dfrac{1}{2}-\dfrac{\sqrt{11}}{2}i\end{align} =====Question 5(ii)===== Find the solutions of

Question 9 & 10, Exercise 1.1

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t align="right"><btn type="success">[[fsc-part1-kpk:sol:unit01:ex1-1-p9|Question 11 >]]</btn></text>