Let
L1:1x−1=2y−2=1z+3=λ
Point on L1≡(λ+1,2λ+2,λ−3)
And,
L2:2x−a=3y+2=1z−3=μ
Point on L2≡(2μ+a,3μ−2,μ+3)
For finding P, we must have
λ−3=μ+3⇒λ=μ+6...(i)
2λ+2=3μ−2⇒2λ=3μ−4...(ii)
Solving (i)&(\mathrm{ii}), we get
λ=22 and μ=16
Therefore,
P≡(23,46,19)
And,
2μ+a=λ+1
⇒32+a=22+1
⇒a=−9
Distance of point P(23,46,19) from the plane z+9=0 is
=∣02+02+1219+9∣=28 units