Help me with q8(iii)

Berikut ini adalah pertanyaan dari fdiannz pada mata pelajaran Matematika untuk jenjang Sekolah Menengah Atas

Jawaban dan Penjelasan

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A vector which lies in the plane OAB and is also perpendicular to ${\bf a}$ is

$\large\text{$\begin{aligned}{\bf u} = 19\,{\bf i}\:-\:4\,{\bf j}\:+\:11\,{\bf k}\end{aligned}$}$

Penjelasan/Explanation

Vektor/Vectors

Given that $\overrightarrow{OA}={\bf a}={\bf i}+2{\bf j}-{\bf k}$ and $\overrightarrow{OB}={\bf b}=3{\bf i}-{\bf j}+2{\bf k}$ , we want to find a vector which lies in the plane $OAB$ and is also perpendicular to ${\bf a}$ .

Let ${\bf u}=u_1\,{\bf i}+u_2\,{\bf j}+u_3\,{\bf k}$ be the vector we want to find. They must satisfy:

${\bf a}$ , ${\bf b}$ , and ${\bf u}$ arecoplanar (Requirement 1).
${\bf u}\perp{\bf a}$ (Requirement 2).

Requirement 1

${\bf a}$ , ${\bf b}$ , and ${\bf u}$ are coplanar if and only if:

$\begin{aligned}{\bf u}\cdot({\bf a}\times{\bf b})&=\begin{vmatrix}u_1&u_2&u_3\\ a_1&a_2&a_3\\ b_1&b_2&b_3 \end{vmatrix}=0\end{aligned}$

By substituting all components of both ${\bf a}$ and ${\bf b}$ , we get:

$\begin{aligned}0&=\begin{vmatrix}u_1&u_2&u_3\\ 1&2&-1\\ 3&-1&2 \end{vmatrix}\\&=4u_1+(-3u_2)+(-u_3)\\&{\quad}-6u_3-u_1-2u_2\\&=3u_1-5u_2-7u_3\\\therefore&\ \ 3u_1-5u_2-7u_3=0\quad...(i)\end{aligned}$

Requirement 2

${\bf u}\perp{\bf a}$ if and only if ${\bf u}\cdot{\bf a}=0$ .

So,

$\begin{aligned}0&={\bf u}\cdot{\bf a}\\&=\begin{pmatrix}u_1\\u_2\\u_3\end{pmatrix}\cdot\begin{pmatrix}1\\2\\-1\end{pmatrix}\\&=u_1+2u_2-u_3\\\therefore&\ \ u_1+2u_2-u_3=0\quad...(ii)\end{aligned}$

Solving (i) and (ii)

From eq. $(i)$ , we get:

$u_1=-2u_2+u_3\quad...(iii)$

$\begin{aligned}&(iii)\to(i):\\&3(-2u_2+u_3)-5u_2-7u_3=0\\&\Rightarrow(-6-5)u_2+(3-7)u_3=0\\&\Rightarrow-11u_2-4u_3=0\\&\Rightarrow-11u_2=4u_3\\&\Rightarrow u_2=-\frac{4}{11}u_3\quad...(iv)\end{aligned}$

$\begin{aligned}(iv)&\to(iii):\\u_1&=-2\left(-\frac{4}{11}u_3\right)+u_3\\&=\left(\frac{8+11}{11}\right)u_3\\&=\frac{19}{11}u_3\end{aligned}$

Hence,

$\begin{aligned}{\bf u}&=u_1{\bf i}+u_2{\bf j}+u_3{\bf k}\\&=\frac{19u_3}{11}\,{\bf i}\:-\:\frac{4u_3}{11}\,{\bf j}\:+\:u_3\,{\bf k}\end{aligned}$

$u_3$ is "symbolic", means whatever value $u_3$ equals to, we’ll get a perpendicular vector to ${\bf a}$ . So, let $u_3=11$ , we get:

$\begin{aligned}{\bf u}&=\frac{19\cdot11}{11}\,{\bf i}\:-\:\frac{4\cdot11}{11}\,{\bf j}\:+\:11\,{\bf k}\\\\\therefore&\ \ \boxed{\ {\bf u}=19\,{\bf i}\:-\:4\,{\bf j}\:+\:11\,{\bf k}\ }\\&\sf or\\\therefore&\ \ \boxed{\ {\bf u}=\begin{pmatrix}19\\-4\\11\end{pmatrix}\ }\end{aligned}$

$\blacksquare$

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Last Update: Sun, 31 Jul 22

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Help me with q8(iii)

Jawaban dan Penjelasan

Penjelasan/Explanation

Vektor/Vectors

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