Practice Questions

Q77.Let the slope of the tangent to a curve y = f(x) at (x, y) be given by 2 tan x(cos x −y). if the curve passes π through the point ( π4 , 0), then the value of ∫ 0 2 ydx is equal to (1) (2 −√2) + √2π (2) 2 − √2π (3) (2 + √2) + √2π (4) 2 + √2π →

Q77.Let →a = 3ˆi + ˆj and→b = ˆi + 2ˆj + ˆk. Let →cbe a vector satisfying →a× (→ ×→c) parallel, then the value of λ is (1) −5 (2) 5 (3) 1 (4) −1 θ is the angle between the vectors

Q77.If 2, 3, 9, 5, 2, 1, 1, 𝜆, 8 and 𝜆, 2, 3 are coplanar, then the product of all possible values of 𝜆 is (1) 21 (2) 59 2 8 57 95 (3) (4) 8 8

Q77.The area enclosed by y2 = 8x and y = √2x that lies outside the triangle formed by y = √2x, x = 1, y = 2√2 , is equal to (1) 16√2 (2) 11√2 6 6 (3) 13√2 (4) 5√2 6 6

Q77.If →a⋅ b = 1, b ⋅→c= 2 and →c⋅→a = 3 , then the value of [→a ( ×→c) ( ×→a)] b (1) 0 (2) −6→a⋅(→ ×→c) → −12b ⋅(→c×→a) (3) 12→c⋅(→a×→b) (4)

Q77.If dy + ex(x2 −2)y = (x2 −2x)(x2 −2)e2x and y(0) = 0 , then the value of y(2) is dx (1) −1 (2) 1 (3) 0 (4) e →

Q77.Let →a = αˆi + ˆj + βˆk and b = 3ˆi −5ˆj + 4ˆk be two vectors, such that →a× b = −ˆi + 9ˆi + 12ˆk. Then the → → projection of b −2→a on b +→a is equal to (1) 2 (2) 395 (3) 9 (4) 465 → → → 23 × b × 2ˆj is equal to ⋅ˆk = 2 , then

Q77.If the length of the perpendicular drawn from the point P(a, 4, 2), a > 0 on the line x+12 = y−33 = z−1−1 is 2√6 units and Q(α1, α2, α3) is the image of the point P in this line, then a + ∑3i=1 αi is equal to (1) 7 (2) 8 (3) 12 (4) 14

Q77.Let →a and b be the vectors along the diagonal of a parallelogram having area 2√2. Let the angle between →a and → → → → → → × −2b, then an angle between b and →cis b be acute. →a = 1 and →a. b = →a× b . If →c= 2√2(→a b) (1) −π (2) 5π 4 6 (3) π (4) 3π 3 4 P . Then the

Q77.Let the vectors →𝑎= 1 + 𝑡 ^𝑖+ 1 - 𝑡 ^𝑗+ ^𝑘, →𝑏= 1 - 𝑡 ^𝑖+ 1 + t ^𝑗+ 2 ^𝑘 and →𝑐= 𝑡 ^𝑖- 𝑡 ^𝑗+ ^𝑘, 𝑡∈𝑅 be such that for 𝛼, 𝛽, 𝛾∈𝑅, 𝛼 →𝑎+ 𝛽 →𝑏+ 𝛾 →𝑐= →0 ⇒𝛼= 𝛽= 𝛾= 0. Then, the set of all values of 𝑡 is (1) a non-empty finite set (2) equal to 𝑁 (3) equal to 𝑅- 0 (4) equal to 𝑅

Q77.Let S be the set of all a ∈R for which the angle between the vectors u = a(loge b)ˆi −6ˆj + 3ˆk and →v= (loge b)ˆi + 2ˆj + 2a(loge b)ˆk, (b > 1) is acute. Then S is equal to (1) (−∞, −43 ) (2) Φ (3) (−43 , 0) (4) ( 127 , ∞) JEE Main 2022 (28 Jul Shift 2) JEE Main Previous Year Paper

Q77.Let a and b be two unit vectors such that |(a + b) + 2(a × b)| = 2. If θ ∈(0, π) is the angle between ˆa and ˆb , then among the statements: (S1) : 2 ˆa × ˆb = ˆa −ˆb is 1 + (S2) : The projection of ˆa on 2 (ˆa ˆb) (1) Only (S1) is true. (2) Only (S2) is true. (3) Both (S1) and (S2) are true. (4) Both (S1) and (S2) are false. JEE Main 2022 (24 Jun Shift 2) JEE Main Previous Year Paper

Q77.The area of the region enclosed between the parabolas 𝑦2 = 2𝑥- 1 and 𝑦2 = 4𝑥- 3 is. 1 1 (1) (2) 3 6 2 3 (3) (4) 3 4

Q77.Let →a = αˆi + ˆj −ˆk and b = 2ˆi + ˆj −αˆk, α > 0 . If the projection of →a× b on the vector −ˆi + 2ˆj −2ˆk is 30 , then α is equal to (1) 15 (2) 8 2 (3) 13 (4) 7 2

Q77.The area bounded by the curves 𝑦= 𝑥2 - 1 and 𝑦= 1 is (1) 2 + 1 (2) 4 - 1 3√2 3√2 8 (3) 2√2 - 1 (4) 3√2 - 1

Q78.Let →a = αˆi + 2ˆj −ˆk and b = −2ˆi + αˆj + ˆk, where α ∈R. If the area of the parallelogram whose adjacent → 2 → → 2 b is equal to ⋅ sides are represented by the vectors →a and b is √15(α2 + 4), then the value of 2→a + (→a b) (1) 10 (2) 7 (3) 9 (4) 14 + = 2ˆi −13ˆj −4ˆk, then

Q78.If the two lines l1 : x−23 = y+1−2 , z = 2 and l2 : x−11 = 2y+3α = z+52 are perpendicular, then an angle between the lines l2 and l3 : 1−x3 = 2y−1−4 = 4z is (1) cos−1( 294 ) (2) sec−1( 294 ) (3) cos−1( 292 ) (4) cos−1( √292 )

Q78.If 𝑦= 𝑦𝑥 is the solution of the differential equation 2𝑥2𝑑𝑦 2𝑥𝑦+ 3𝑦2 = 0 such that 𝑦𝑒= 𝑒 then 𝑦1 is equal 𝑑𝑥- 3, to (1) 1 (2) 2 3 3 3 (3) (4) 3 2

Q78.Let the solution curve of the differential equation x dxdy −y = √y2 + 16x2, y(1) = 3 be y = y(x). Then y(2) is equal to (1) 15 (2) 11 (3) 14 (4) 17 →

Q78.A plane E is perpendicular to the two planes 2x −2y + z = 0 and x −y + 2z = 4 , and passes through the point P(1, −1, 1). If the distance of the plane E from the point Q(a, a, 2) is 3√2 , then (PQ)2 is equal to (1) 9 (2) 12 (3) 21 (4) 33 y−6

Q78.Let the lines x−1 λ = y−21 = z−32 and x+26−2 = y+183 = z+28λ be coplanar and P be the plane containing these two lines. Then which of the following points does NOT lies on P ? (1) (0, −2, −2) (2) (−5, 0, −1) (3) (3, −1, 0) (4) (0, 4, 5)

Q78.Let ˆa and ˆb be two unit vectors such that the angle between them is π4 . If and + × then the value of 164 cos2 θ is equal to (ˆa ˆb) (ˆa + 2ˆb + 2(ˆa ˆb)) (1) 90 + 27√2 (2) 45 + 18√2 (3) 90 + 3√2 (4) 54 + 90√2

Q78.If the shortest distance between the lines x−1 2 = y−23 = z−3λ and x−21 = y−44 = z−55 is √31 , then the sum of all possible values of λ is: (1) 16 (2) 6 (3) 12 (4) 15

Q78.Let a vector →𝑎 has a magnitude 9. Let a vector →𝑏 be such that for every 𝑥, 𝑦𝑅× 𝑅- 0, 0, the vector 𝑥→𝑎+ 𝑦 →𝑏 is → → perpendicular to the vector 6𝑦 →𝑎- 18𝑥 𝑏. Then the value of →𝑎× 𝑏 is equal to (1) 9√3 (2) 27√3 (3) 9 (4) 81

Q78.Let →a = 2ˆi −ˆj + 5ˆk and b = αˆi + βˆj + 2ˆk. If ((→a b) ׈i) (1) 4 (2) 5 (3) √21 (4) √17