Practice Questions
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Q87.Let A(3, 0, β1), B(2, 10, 6) and C(1, 2, 1) be the vertices of a triangle and M be the mid-point of AC . If G divides BM in the ratio, 2 : 1 , then cos(β GOA) ( O being the origin) is equal to (1) 1 (2) 1 β30 6β10 (3) 1 (4) 1 β15 2β15 , then Ξ²
Q87.Let βa = 2Λi + Ξ»1Λj + 3Λk, b = 4Λi + (3 βΞ»2)Λj + 6Λk and βc= 3Λi + 6Λj + (Ξ»3 β1)Λk be three vectors such that β b = 2βa and βa is perpendicular to βc. Then a possible value of (Ξ»1, Ξ»2, Ξ»3) is (1) (β12 , 4, 0) (2) (1, 5, 1) (3) ( 12 , 4, β2) (4) (1, 3, 1)
Q87.If the volume of parallelepiped formed by the vectors ^π+ π^π+ ^π, ^π+ π^π and π^π+ ^π is minimum, then π is equal to: 1 (1) - (2) -β3 β3 1 (3) β3 (4) β3
Q87.The sum of the distinct real values of ΞΌ for which the vectors ΞΌΛi + Λj + Λk, Λi + ΞΌΛj + Λk, Λi + Λj + ΞΌΛk are co- planar, is (1) 0 (2) β1 (3) 1 (4) 2
Q87.Let βa = ^i + 2^j + 4^k,βb = ^i + Ξ»^j + 4^k and βc = 2^i + 4^j + (Ξ»2 β1)^k be coplanar vectors. Then the non-zero vector βa Γ βc is: (1) β10^i β5^j (2) β14^i β5^j (3) β14^i + 5^j (4) β10^i + 5^j
Q87.Two lines xβ3 1 = y+13 = zβ6β1 and x+57 = yβ2β6 = zβ34 intersect at the point R. The reflection of R in the xy - plane has coordinates: (1) (2,-4,-7) (2) (2,4,7) (3) (2,-4,7) (4) (-2,4,7)
Q87.Let is parallel to Ξ± and Ξ± = 3Λi + Λj and Ξ² = 2Λi βΛj + 3Λk. If Ξ² = Ξ±, Ξ²1 βΞ²2, Ξ²2 is perpendicular to where Ξ²1 βββ β then Ξ²1 Γ Ξ²2 is equal to: (1) 1 2 (β3Λi + 9Λj + 5Λk) (2) 3Λi β9Λj β5Λk (3) β3Λi + 9Λj + 5Λk (4) 1 + 2 (3Λi β9Λj 5Λk)
Q87.A plane which bisects the angle between the two given planes 2x βy + 2z β4 = 0 and x + 2y + 2z β2 = 0, passes through the point (1) (2, 4, 1) (2) (1, β4, 1) (3) (1, 4, β1) (4) (2, β4, 1)
Q87.Let βπ= ^π- ^π, βπ= ^π+ ^π+ ^π and βπ be a vector such that βπΓ βπ+ βπ= β0 and βπ. βπ= 4, then |βπ| is equal to: 19 (1) (2) 9 2 (3) 17 (4) 8 2
Q88.The vertices B and C of a ΞABC lie on the line, x+2 3 = yβ10 = 4z such that BC = 5 units. Then the area (in sq. units) of this triangle, given the point A(1, β1, 2), is (1) 6 (2) 2β34 (3) β34 (4) 5β17
Q88.A plane passing though the points (0, β1, 0) and (0, 0, 1) and making an angle Ο4 with the plane yβz + 5 = 0, also passes through the point β1, 1, (1) (β2, 4) (2) (β2, 4) β1, 1, (3) (ββ2, β4) (4) (ββ2, β4)
Q88.The plane through the intersection of the planes π₯+ π¦+ π§= 1 and 2π₯+ 3π¦- π§+ 4 = 0 and parallel to π¦- axis also passes through the point (1) 3, 3, - 1 (2) -3, 1, 1 (3) 3, 2, 1 (4) -3, 0, - 1
Q88.The vector equation of the plane through the line of intersection of the planes π₯+ π¦+ π§= 1 and 2π₯+ 3π¦+ 4π§= 5 which is perpendicular to the plane π₯- π¦+ π§= 0 is (1) βπΓ ^π+ ^π+ 2 = 0 (2) βπβ ^π- ^π- 2 = 0 (3) βπΓ ^π- ^π+ 2 = 0 (4) βπβ (^π- ^π) + 2 = 0
Q88.The length of the perpendicular from the point ( 2, - 1, 4 ) on the straight line π₯+ 3 = π¦- 2 = π§ is 10 -7 1 (1) greater than 3 but less (2) greater than 4 (3) less than 2 (4) greater than 2 but less than 4 than 3
Q88.A tetrahedron has vertices P(1, 2, 1), Q(2, 1, 3), R(β1, 1, 2) and O(0, 0, 0). The angle between the faces OPQ and PQR is JEE Main 2019 (12 Jan Shift 1) JEE Main Previous Year Paper (1) cosβ1( 317 ) (2) cosβ1( 3117 ) (3) cosβ1( 3519 ) (4) cosβ1( 359 )
Q88.The length of the perpendicular drawn from the point (2, 1, 4) to the plane containing the lines is + + + + βr= (Λi Λj) Ξ»(Λi + 2Λj βΛk) and βr= (Λi Λj) ΞΌ(βΛi + Λj β2Λk) (1) 1 (2) 3 3 (3) β3 (4) 1 β3
Q88.If the lines x = ay + b, z = cy + d and x = aβ²z + bβ², y = cβ² z + dβ² are perpendicular, then (1) ccβ + a + aβ = 0 (2) aaβ + c + cβ = 0 (3) bbβ + ccβ + 1 = 0 (4) abβ + bcβ + 1 = 0
Q88.Let βπ= 3^π+ 2^π+ 2^π and βπ= ^π+ 2^π- 2^π be two vectors. If a vector perpendicular to both the vectors βπ+ βπ and βπ- βπ has the magnitude 12 then one such vector is: (1) 4(2^π+ 2^π+ ^π) (2) 4(2^π- 2^π- ^π) (3) 4( - 2^π- 2^π+ ^π) (4) 4(2^π+ 2^π- ^π)
Q88.If the point (2, Ξ±, Ξ²) lies on the plane which passes through the points (3,4,2) and (7,0,6) and is perpendicular to the plane 2x β5y = 15, then 2Ξ± β3Ξ² is equal to : (1) 12 (2) 7 (3) 5 (4) 17
Q88.The plane containing the line xβ3 2 = y+2β1 = zβ13 and also containing its projection on the plane 2x + 3y βz = 5 , contains which one of the following points? (1) (2,2,0) (2) (-2,2,2) (3) (0,-2,2) (4) (2,0,-2)
Q88.The plane which bisects the line segment joining the points (β3, β3, 4) and (3, 7, 6) at right angles, passes through which one of the following points? (1) (2, 1, 3) (2) (4, 1, β2) (3) (4, β1, 7) (4) (β2, 3, 5) yβ5
Q88.If the length of the perpendicular from the point (Ξ², 0, Ξ²), (Ξ² β 0) to the line, x1 = yβ10 = z+1β1 is β32 is equal to (1) 2 (2) β1 (3) β2 (4) 1
Q88.Let S be the set of all real values of Ξ» such that a plane passing through the points (βΞ»2, 1, 1), (1, βΞ»2, 1) and (1, 1, βΞ»2) also passes through the point (β1, β1, 1). Then S is equal to : (1) {β3} (2) {3, β3} (3) {1, β1} (4) {β3, ββ3}
Q88.Let A be a point on the line βr= (1 β3ΞΌ)Λi + (ΞΌ β1)Λj + (2 + 5ΞΌ)Λk and B(3, 2, 6) be a point in the space. ββ Then the value of ΞΌ for which the vector AB is parallel to the plane x β4y + 3z = 1 is (1) 1 (2) 1 2 4 (3) β14 (4) 81
Q88.If the plane 2π₯- π¦+ 2π§+ 3 = 0 has the distances 1 and 2 units from the planes 4π₯- 2π¦+ 4π§+ π= 0 and 3 3 2π₯- π¦+ 2π§+ π= 0 , respectively, then the maximum value of π+ π is equal to: (1) 9 (2) 15 (3) 13 (4) 5 π₯- 1 π¦+ 1 π§