Question

solve

$$\begin{gathered} Considerthelines \\ \overline{r}=(i+2j-2k)+\lambda (i+2j)and \\ \overline{r}=(i+2j-2k)+\mu (2j-k) \end{gathered}$$
a) Find the angle between the lines.
b) Find a vector perpendicular to both the lines.
c) Find the equation of the line passing through the point of intersection of lines and perpendicular to both the lines.

Answer 1

$$\begin{gathered} L1:\stackrel{\rightharpoonup }{r}=\stackrel{⏜}{i}+2\stackrel{⏜}{j}-2\stackrel{⏜}{k}+\lambda \left(\stackrel{⏜}{i}+2\stackrel{⏜}{j}\right) \\ L2:\stackrel{\rightharpoonup }{r}=\stackrel{⏜}{i}+2\stackrel{⏜}{j}-2\stackrel{⏜}{k}+\mu \left(2\stackrel{⏜}{j}-\stackrel{⏜}{k}\right) \\ Theterminsidebracketsa\mathrm{lo}ngside\lambda and\mu representvectorsparalleltoL1andL2respectively \\ vectorparalleltoL1,\stackrel{\rightharpoonup }{b_1}=\stackrel{⏜}{i}+2\stackrel{⏜}{j} \\ vectorparalleltoL2,\stackrel{\rightharpoonup }{b_2}=2\stackrel{⏜}{j}-\stackrel{⏜}{k} \\ Anglebetweenlines \\ Cos\theta =\left|\frac{\stackrel{\rightharpoonup }{b_1}.\stackrel{\rightharpoonup }{b_2}}{\left|\stackrel{\rightharpoonup }{b_1}\right|\left|\stackrel{\rightharpoonup }{b_1}\right|}\right|=\frac{4}{\sqrt{5}\sqrt{5}}=\frac{4}{5} \\ \theta ={\cos }^{-1}\frac{4}{5} \\ Vectorperpendicularboththelines=\stackrel{\rightharpoonup }{b_1}\times \stackrel{\rightharpoonup }{b_2}=\left|\begin{array}{ccc}\hat{i}& \hat{j}& \hat{k}\\ 1& 2& 0\\ 0& 2& -1\end{array}\right|=-2\stackrel{⏜}{i}+\stackrel{⏜}{j}+2\stackrel{⏜}{k} \\ ObserveequationofL1andL2thevectorindependentof\lambda and\mu representthepositionvectorofpointthroughwhichL1andL2passes \\ Sincetheybothpassthrough\stackrel{⏜}{i}+2\stackrel{⏜}{j}-2\stackrel{⏜}{k}thereforetheyintersectat\stackrel{⏜}{i}+2\stackrel{⏜}{j}-2\stackrel{⏜}{k} \\ EquationoflineLpas\sin gthrough\stackrel{⏜}{i}+2\stackrel{⏜}{j}-2\stackrel{⏜}{k}andparallelto-2\stackrel{⏜}{i}+\stackrel{⏜}{j}+2\stackrel{⏜}{k} \\ \stackrel{\rightharpoonup }{r}=\stackrel{⏜}{i}+2\stackrel{⏜}{j}-2\stackrel{⏜}{k}+\alpha \left(-2\stackrel{⏜}{i}+\stackrel{⏜}{j}+2\stackrel{⏜}{k}\right) \end{gathered}$$