Practice Questions

Q85.Let S = {θ ∈(0, 2π) : 7 cos2 θ −3 sin2 θ −2 cos2 2θ = 2}. Then, the sum of roots of all the equations x2 −2(tan2 θ + cot2 θ)x + 6 sin2 θ = 0 θ ∈S, is _______.

Q85.Let P1 be a parabola with vertex (3, 2) and focus (4, 4) and P2 be its mirror image with respect to the line x + 2y = 6. Then the directrix of P2 is x + 2y = _____.

Q86.Let S be the set containing all 3 × 3 matrices with entries from {−1, 0, 1} . The total number of matrices A ∈S such that the sum of all the diagonal elements of ATA is 6 is ______.

Q86.Let S = [−π, π2 ) −{−π2 , −π4 , −3π4 , π4 }. Then the number of elements in the set A = ∈S : tan + √5 = √5 {θ θ(1 tan(2θ)) −tan(2θ)} is _____ .

Q86.Let 𝑓𝑥= 2𝑥2 + 1 and 𝑔𝑥= 2𝑥- 3, 𝑥< 0 , where 𝑡 is the greatest integer ≤𝑡. Then, in the open interval 2𝑥+ 3, 𝑥≥0 -1, 1, the number of points where fog is discontinuous is equal to ______.

Q86.Let the mirror image of a circle c1 : x2 + y2 −2x −6y + α = 0 in line y = x + 1 be c2 : 5x2 + 5y2 + 10gx +10fy + 38 = 0. If r is the radius of circle c2 , then α + 6r2 is equal to ______

Q86.The sum of the maximum and minimum values of the function f(x) = |5x −7| + [x2 + 2x] in the interval [ 54 , 2], where [t] is the greatest integer ≤t, is ______.

Q86.Suppose a class has 7 students. The average marks of these students in the mathematics examination is 62 , and their variance is 20 . A student fails in the examination if he/she gets less than 50 marks, then in worst case, the number of students can fail is where i = √−1. Then, the number of elements in the set

Q87.Let Max Min Max , = α1 + α2 loge( 158 ), then { 9−x25−x } 5−x } { 9−x25−x x}dx = β. If ∫2α−1β−83 0⩽x⩽2 = α and 0⩽x⩽2{ α1 + α2 is equal to ______

Q87.If 𝑡 denotes the greatest integer ≤𝑡, then number of points, at which the function 𝑓𝑥= 42𝑥+ 3 + 1 9𝑥+ - 12𝑥+ 20 is not differentiable in the open interval -20, 20, is ______. 2

Q87.The sum of all the elements of the set {α ∈{1, 2, … . . 100} : HCF(α, 24) = 1} is a, b ∈{1, 2, 3, … and let Tn = {A ∈S : An(n+1) = I} . Then the number of 100}}

Q87.Let f and g be twice differentiable even functions on (−2, 2) such that f( 41 ) = 0, f( 21 ) = 0, f(1) = 1 and g( 34 ) = 0, g(1) = 2 Then, the minimum number of solutions of f(x)g′′(x) + f ′(x)g′′(x) = 0 in (−2, 2) is equal to _____.

Q87.Two tangent lines l1 and l2 are drawn from the point (2, 0) to the parabola 2y2 = −x. If the lines l1 and l2 are also tangent to the circle (x −5)2 + y2 = r, then 17r2 is equal to y2

Q87.For k ∈R, let the solutions of the equation cos(sin−1(x cot(tan−1(cos(sin−1 x))))) = k, 0 < |x| < 1 be α √2 and β, where the inverse trigonometric functions take only principal values. If the solutions of the equation 1 and α , then b is equal to ______. x2 −bx −5 = 0 are 1 + β α2 β2 k2

Q87.Let 𝑓𝑥= 𝑥- 1𝑥2 - 2𝑥- 3 + 𝑥- 3, 𝑥∈ℝ. If 𝑚 and 𝑀 are respectively the number of points of local minimum and local maximum of 𝑓 in the interval 0, 4, then 𝑚+ 𝑀 is equal to _____.

Q87.Let 𝐴 be a 3 × 3 matrix having entries from the set -1, 0, 1. The number of all such matrices 𝐴 having sum of all the entries equal to 5, is _____ Q88. 1 𝑥25 Let 𝑓: 𝑅→𝑅 be a function defined by 𝑓𝑥= 21 - 2 + 𝑥25 50. If the function 𝑔𝑥= 𝑓𝑓𝑓𝑥+ 𝑓𝑓𝑥, then the 2 greatest integer less than or equal to 𝑔1 is ______.

Q87.Let the function f(x) = 2x2 −loge x, x > 0, be decreasing in (0, a) and increasing in (a, 4). A tangent to the parabola y2 = 4ax at a point P on it passes through the point (8a, 8a −1) but does not pass through the point (−1a , 0). If the equation of the normal at P is αx + βy = 1 , then α + β is equal to n ∈N is equal to _______.

Q88.Let A = {1, a1, a2 … … a18, 77} be a set of integers with 1 < a1 < a2 < … . . < a18 < 77. Let the set A + A = {x + y : x, y ∈A} contain exactly 39 elements. Then, the value of a1 + a2 + … . . +a18 is equal to ______.

Q88.Let y = y(x) be the solution of the differential equation dx 2 2 cos4 x−cos 2x with y( π4 ) = π232 . If y( π3 ) = π218 e−tan−1(α) , then the value of 3α2 is equal to ______.

Q88.If the sum of all the roots of the equation e2x −11ex −45e−x + 812 = 0 is loge P , then P is equal to _____.

Q88.Let f(x) = min{[x −1], [x −2], … , [x −10]} where [t] denotes the greatest integer ≤t. Then ∫100 f(x)dx + ∫100 (f(x))2dx + ∫100 |f(x)|dx is equal _______. to x > 0 and f(1) = √3 . If y = f(x)

Q88.The value of the integral dx is equal to ______. π4 48 ∫π0 ( 3πx22 −x3) 1+cos2sin x x

Q88.Suppose 𝑦= 𝑦𝑥 be the solution curve to the differential equation 𝑑𝑦 𝑦= 2 - 𝑒-𝑥 such that lim is finite. 𝑑𝑥- 𝑥→∞𝑦𝑥 If 𝑎 and 𝑏 are respectively the 𝑥- and 𝑦- intercept of the tangent to the curve at 𝑥= 0, then the value of 𝑎- 4𝑏 is equal to _______.

Q88.Let f be a twice differentiable function on R. If f ′(0) = 4 and f(x) + ∫x0 (x −t)f ′(t)dt = (e2x + e−2x) cos 2x + a2 x, then (2a + 1)5a2 is equal to _______. n ∈N . Then the sum of all the elements of the set

Q88.Let 𝑓𝑥= 4𝑥2 - 8𝑥+ 5, if 8𝑥2 - 6𝑥+ 1 ≥0 , where 𝛼 denotes the greatest integer less than or equal to 𝛼. 4𝑥2 - 8𝑥+ 5, if 8𝑥2 - 6𝑥+ 1 < 0 Then the number of points in 𝑅 where 𝑓 is not differentiable is _____ . 1 𝑛+ 1𝑘- 1