A tetrahedron has vertices P(1,2,1),Q(2,1,3),R(−1,1,2) and O(0,0,0). The angle between the faces OPQ and PQR is:
A
cos−1(1935)
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B
cos−1(1731)
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C
cos−1(935)
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D
cos−1(731)
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Solution
The correct option is Acos−1(1935) Let →x1 and →x2 are the normal vectors to the faces OPQ and PQR
The vertices of tetrahedron are P(1,2,1),Q(2,1,3),R(−1,1,2) and O(0,0,0).
⇒→x1=−−→OP×−−→OQ=∣∣
∣
∣∣^i^j^k121213∣∣
∣
∣∣ =^i(6−1)−^j(3−2)+^k(1−4) ⇒→x=5^i−^j−3k
Similarly, →x2=−−→PQ×−−→PR=∣∣
∣
∣∣^i^j^k1−12−2−11∣∣
∣
∣∣ =^i(−1+2)−^j(1+4)+^k(−1−2) ⇒→x2=^i−5^j−3^k
Angle between the faces OPQ and PQR - cosθ=→x1.→x2|→x1|.|→x2|=5+5+9√35√35⇒θ=cos−1(1935)