The length of two opposite edges of a tetrahedron are 12 and 15 units and the shortest distance between them is 10 units. If the volume of the tetrahedron is 200 cubic units, then the angle between the 2 edges is

Question

The length of two opposite edges of a tetrahedron are 12 and 15 units and the shortest distance between them is 10 units. If the volume of the tetrahedron is 200 cubic units, then the angle between the 2 edges is (A) sin- 1(1/2) (B) sin- 1(2/3) (C) sin- 1(3/4) (D) sin- 1(4/5)

Tardigrade Admin · Accepted Answer

Let, ABCD be the tetrahedron and position vectors of A,B,C,D be overset arrow a, overset arrow b, overset arrow c, overset arrow d respectively. Given, | overset arrow b - overset arrow a|=12 | overset arrow d - overset arrow c|=15 Shortest distance =|(( overset arrow d - overset arrow b) ⋅ ( overset arrow b - overset arrow a) × ( overset arrow d - overset arrow c)/|( overset arrow b - overset arrow a) × ( overset arrow d - overset arrow c)|)|=10 ... (1) Also, volume =(1/6)|( overset arrow d - overset arrow a) ⋅ ( overset arrow b - overset arrow a) × ( overset arrow c - overset arrow a)|=200 ... (2) From (1) and (2) , we get, |( overset arrow b - overset arrow a) × ( overset arrow d - overset arrow c)|× 10=6× 200 | overset arrow b - overset arrow a|| overset arrow d - overset arrow c|sin θ =120 sin θ =(2/3)⇒ θ =sin- 1(2/3)

Q. The length of two opposite edges of a tetrahedron are $12$ and $15$ units and the shortest distance between them is $10$ units. If the volume of the tetrahedron is $200$ cubic units, then the angle between the $2$ edges is

$s i n^{- 1} \frac{1}{2}$

$s i n^{- 1} \frac{2}{3}$

$s i n^{- 1} \frac{3}{4}$

$s i n^{- 1} \frac{4}{5}$

Q. The length of two opposite edges of a tetrahedron are 12 and 15 units and the shortest distance between them is 10 units. If the volume of the tetrahedron is 200 cubic units, then the angle between the 2 edges is

sin−121​

sin−132​

sin−143​

sin−154​

Q. The length of two opposite edges of a tetrahedron are $12$ and $15$ units and the shortest distance between them is $10$ units. If the volume of the tetrahedron is $200$ cubic units, then the angle between the $2$ edges is

$s i n^{- 1} \frac{1}{2}$

$s i n^{- 1} \frac{2}{3}$

$s i n^{- 1} \frac{3}{4}$

$s i n^{- 1} \frac{4}{5}$