Operasi Hitung Selisih Dua Vektor pada R3
- Jika dua vektor $\underline{a}=\begin{pmatrix}a_{1}\\ a_{2}\\ a_{3}\end{pmatrix}$ dan vektor $\underline{b}=\begin{pmatrix}b_{1}\\ b_{2}\\ ba_{3}\end{pmatrix}$ maka operasi pengurangan kedua vektor didefinisikan sebagai berikut : $\underline{a}-\underline{b}=\begin{pmatrix}a_{1}\\ a_{2}\\ a_{3}\end{pmatrix}-\begin{pmatrix}b_{1}\\ b_{2}\\ b_{3}\end{pmatrix}=\begin{pmatrix}a_{1}-b_{1}\\ a_{2} -b_{2}\\ a_{3} -b_{3}\end{pmatrix}$
- Jika Vektor $\underline{a}=a_{1}\overline{i}+a_{2}\overline{j}+a_{3}\overline{k}$ dan vektor $\underline{b}=b_{1}\overline{i}+b_{2}\overline{j}+b_{3}\overline{k}$, maka operasi pengurangan kedua vektor didefinisikan sebagai berikut : $\underline{a}+\underline{b}=\left (a_{1}-b_{1} \right )\overline{i}+\left (a_{2}-b_{2} \right )\overline{j}+\left (a_{3}-b_{3} \right )\overline{k}$
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