Advertisements
Advertisements
प्रश्न
Show that the lines `vecr = veca + λvecb` and `vecr = vecb + μveca` are coplanar and the plane containing them is given by `vecr.(veca xx vecb) = 0`.
योग
Advertisements
उत्तर
`vecr = veca + λvecb` and `vecr = vecb + μveca`
They are coplanar if shortest distance between them is zero.
S.D. = 0
S.D. = `((vec(a_2) - vec(a_1)).(vec(b_1) xx vec(b_2)))/(|vec(b_1) xx vec(b_2)|)` ...`[vecr = vec(a_1) + λvec(b_1) and vecr = vec(a_2) + λvec(b_2)]`
S.D. = `((vecb - veca).(vecb xx veca))/(|vecb xx veca|)`
S.D. = `0/(|vecb xx veca|)`
S.D. = 0
Here, shortest distance between these lines is zero, hence the lines `vecr = veca + λvecb` and `vecr = vecb + μveca` are coplanar.
shaalaa.com
क्या इस प्रश्न या उत्तर में कोई त्रुटि है?
