Answer:
Step-by-step explanation:
Given points P(1, -1, 4), Q (4,2,1) vector equation of a line joining the points with position vectors r₀ and r₁ is:
r = (1 - t)r₀ + tr₁
where
t ∈ [0, 1]
and r₀ = P = (1, -1, 4)
r₁ = Q = (4, 2, 1)
r(t) = (1 - t) [tex]\langle 1,-1,4\rangle[/tex] + t[tex]\langle 4,2,1 \rangle[/tex]
[tex]r(t) = \langle 1 - t , -1 + t, 4 - 4t \rangle + \langle 4t, 2t, t \rangle[/tex]
[tex]r(t) = \langle 1 - t+4t , -1 + t+ 2t, 4 - 4t+ t \rangle[/tex]
[tex]r(t) = \langle 1 +3t , -1 +3t, 4 - 3t \rangle[/tex]
∴
The vector equation [tex]r(t) = \langle 1 +3t , -1 +3t, 4 - 3t \rangle[/tex] where t ∈ [0,1] is:
r(t) = (1+3t)i - (1+3t)j + (4 - 3t)k
The parametric equation is:
x(t) = 1 + 3t
y(t) = -1 + 3t
z(t) = 4 - 3t
(x(t), y(t), z(t) ) = ( 1 + 3t, -1 + 3t, 4 - 3t )
Answer:
( 1 + 3t, - 1 + 3t, 4 - 3t )
Step-by-step explanation:
Hope this helps
