Answer:
the equation of the line Lβ(t) is Lβ(t)= β(5,1β,2β)+(12,20,30)*t
Step-by-step explanation:
for the lines
Lβ(t) = (5,4,9)+(-5,7,-5)*t
Lβ(t) = (0,4,9)+(-5,1,-1)*t
then the vector V perpendicular to both Lβ and Lβ can be found through the vectorial product of its parallel vectors
[tex]V=\left[\begin{array}{ccc}i&j&k\\-5&7&-5\\-5&1&-1\end{array}\right] = \left[\begin{array}{ccc}7&-5\\1&-1\end{array}\right]*i + \left[\begin{array}{ccc}-5&-5\\-5&-1\end{array}\right]*j + \left[\begin{array}{ccc}-5&7\\-5&1\end{array}\right]*j = -2*i -20*j + 30*k= (-2,-20,30)\\[/tex]
then the equation of the line Lβ(t) that goes through β(5 β,1β,2β) in t=0 and has V as parallel vector is
Lβ(t)= β(5,1β,2β)+(-2,-20,30)*t
