Three lines L1: vecr=λ hati, λ ∈ R, L2: vecr= hatk+μ hatj, μ ∈ R and L3: barr= hati+ hatj+v hatk, v ∈ R are given. For which point(s) Q on L2 can we find a point P on L1 and a point R on L3 so that P, Q and R are collinear?

Question

Three lines L1: vecr=λ hati, λ ∈ R, L2: vecr= hatk+μ hatj, μ ∈ R and L3: barr= hati+ hatj+v hatk, v ∈ R are given. For which point(s) Q on L2 can we find a point P on L1 and a point R on L3 so that P, Q and R are collinear? (A)  hatk+(1/2) hatj (B)  hatk+ hatj (C)  hatk (D) None of these

Tardigrade Admin · Accepted Answer

Let P(a, 0,0), Q(0, b, 1) and R(1,1, c) be points on the line L1, L2 and L3 respectively. P, Q, R are collinear if (-a/1)=(b/1-b)=(1/c-1) As long as b ≠ 0,1, we can have a unique a and c. Thus Q can't be collinear at (0,1,1) and (0,0,1).

$\hat{k} + \frac{1}{2} \hat{j}$

$\hat{k} + \hat{j}$

$\hat{k}$

None of these

Q. Three lines L1​:r=λi^,λ∈R,L2​:r=k^+μj^​,μ∈R and L3​:rˉ=i^+j^​+vk^,v∈R are given. For which point(s) Q on L2​ can we find a point P on L1​ and a point R on L3​ so that P,Q and R are collinear?

k^+21​j^​

k^+j^​

k^

None of these

Let P(a,0,0),Q(0,b,1) and R(1,1,c) be points on the line L1​,L2​ and L3​ respectively. P,Q,R are collinear if 1−a​=1−bb​=c−11​ As long as b=0,1, we can have a unique a and c. Thus Q can't be collinear at (0,1,1) and (0,0,1).

$\hat{k} + \frac{1}{2} \hat{j}$

$\hat{k} + \hat{j}$

$\hat{k}$