Practice Questions

Q85.If 𝑓𝑥= 𝑥2 + 𝑔'1𝑥+ 𝑔"2 and 𝑔𝑥= 𝑓1𝑥2 + 𝑥𝑓'𝑥+ 𝑓"𝑥, then the value of 𝑓4 - 𝑔4 is equal to _____ .

Q85.The number of elements in the set {n ∈N : 10 ≤n ≤100 and 3n −3 is a multiple of 7} is _______. JEE Main 2023 (15 Apr Shift 1) JEE Main Previous Year Paper

Q85.If four distinct points with position vectors →a,→b,→cand →d are coplanar, then [→a→b→c] + + + + (1) [→d →b →a] [→a →c →d ] [→d→b →c] (2) [→a →d →b] [→d →c →a] [→d →b →c] (3) [→d →c →a] + [→b →d →a] + [→c →d →b ] (4) [→b →c →d ] + [→d →a →c] + [→d →b →a] → → → = 27 and b ⋅→c=

Q85.The remainder on dividing 599 by 11 is _____ .

Q86.Let →a = 4ˆi + 3ˆj and→b = 3ˆi −4ˆj + 5ˆk and→cis a vector such that →c⋅(→a → b) + 25 = 0,→c⋅(ˆi ˆk) → and projection of →con →a is 1 , then the projection of →con b equals: (1) 5 (2) 1 √2 5 (3) 1 (4) 3 √2 √2

Q86.Let 𝑓1𝑥= 3𝑥+ 2 𝑥∈𝑅- - 3 For 𝑛≥2, define 𝑓𝑛𝑥= 𝑓1𝑜𝑓𝑛- 1𝑥. If 𝑓5𝑥= 𝑎𝑥+ 𝑏 gcd𝑎, 𝑏= 1, then 𝑎+ 𝑏 is 2𝑥+ 3, 2. 𝑏𝑥+ 𝑎, equal to ________

Q86.Let →a = 2ˆi −7ˆj + 5ˆk , b = ˆi + ˆk and→c= ˆi + 2ˆj −3ˆk be three given vectors. If→ris a vector such that →r×→a =→c×→a and→r⋅→b = 0 , then →r is equal to: (1) 11 7 √2 (2) 117 (3) 11 5 √2 (4) √9147

Q86.Let a tangent to the curve 9𝑥2 + 16𝑦2 = 144 intersect the coordinate axes at the points 𝐴 and 𝐵. Then, the minimum length of the line segment 𝐴𝐵 is ______

Q86.Let →a, b and →cbe three non-zero non-coplanar vectors. Let the position vectors of four points A, B, C and D −−−→ → → → → → → be →a− b +→c, λ→a−3 b + 4→c, −→a+ 2 b −3→cand 2→a−4 b + 6→crespectively. If AB , AC and AD are coplanar, then λ is : JEE Main 2023 (29 Jan Shift 1) JEE Main Previous Year Paper

Q86.Let →aand→b be two vectors. Let →a = 1, →b = 4 and →a⋅→b = 2 . If →c= (2→a →b) (1) −24 (2) −48 (3) −84 (4) −60

Q86.Let 𝑎∈ℤ and 𝑡 be the greatest integer ≤𝑡, then the number of points, where the function 𝑓𝑥= 𝑎+ 13 sin𝑥, 𝑥∈0, 𝜋 is not differentiable, is ____________

Q86.Let A = {1, 2, 3, 4} and R be a relation on the set A × A defined by R = {((a, b), (c, d)) : 2a + 3b = 4c + 5d} . Then the number of elements in R is _________. α, β > 0 , then α2 + β2 is dx , |x| <

Q86.If the variance of the frequency distribution 𝑥𝑖 2 3 4 5 6 7 8 Frequency 𝑓i 3 6 16 𝛼 9 5 6 is 3, then 𝛼 is equal to

Q86.The sum of all values of α, for which the points whose position vectors are ˆi −2ˆj + 3ˆk, 2ˆi −3ˆj + 4ˆk, (α + 1)ˆi + 2ˆk and 9ˆi + (α −8)ˆj + 6ˆk are coplanar, is equal to (1) −2 (2) 2 (3) 6 (4) 4

Q86.The mean and standard deviation of the marks of 10 students were found to be 50 and 12 respectively. Later, it was observed that two marks 20 and 25 were wrongly read as 45 and 50 respectively. Then the correct variance is JEE Main 2023 (13 Apr Shift 2) JEE Main Previous Year Paper

Q86.The shortest distance between the lines x + 1 = 2 y = −12z and x = y + 2 = 6z −6 is (1) 2 (2) 3 (3) 5 (4) 3 2 2

Q86.The vector →a = −ˆi + 2ˆj + ˆk is rotated through a right angle, passing through the y-axis in its way and the → → resulting vector is b. Then the projection of 3→a+ √2 b on →c= 5ˆi + 4ˆj + 3ˆk is (1) 3√2 (2) 1 (3) √6 (4) 2√3

Q86.Let →a = 6ˆi + 9ˆj + 12ˆk, b = αˆi + 11ˆj −2ˆk and →cbe vectors such that →a×→c=→a× b If →a⋅→c= −12, and →c⋅(ˆi −2ˆj + ˆk) = 5 then →c⋅(ˆi + ˆj + ˆk) is equal to _______

Q86.Let →a = ˆi + 2ˆj + λˆk, b = 3ˆi −5ˆj −λˆk, →a⋅→c= 7 , 2( ⋅→c)

Q86.Let →a,→b,→cbe three vectors such that →a = √31, 4 →b = →c = 2 and 2(→a →b) → 2 2π →a×→c , then is equal to _____ . between b and →cis → 3 b ) ( →a⋅

Q86.Let →a = 3ˆi +ˆj −ˆk and →c= 2ˆi −3ˆj + 3ˆk. If b is a vector such that →a = b ×→c and b = 50, then → 2 72 − b +→c is equal to __________.

Q86.Let →a = ˆi + 2ˆj + 3ˆk and b = ˆi + ˆj −ˆk. If →cis a vector such that →a⋅→c= 11, b ⋅(→a×→c) 2 is equal to −√3→b , then →a×→c

Q86.The area of the quadrilateral ABCD with vertices A(2, 1, 1), B(1, 2, 5), C(−2, −3, 5) and D(1, −6, −7) is equal to (1) 48 (2) 8√38 (3) 54 (4) 9√38

Q86.In the figure, θ1 + θ2 = π2 and √3BE θ1 then the perimeter (in unit) of ∆CED is equal to

Q86.Let the plane x + 3y −2z + 6 = 0 meet the co-ordinate axes at the points A, B, C . If the orthocenter of the triangle ABC is (α, β, 76 ), then 98(α + β)2 is equal to __________.