Practice Questions

Q68.Let P(a1, b1) and Q(a2, b2) be two distinct points on a circle with center C(√2, √3). Let and OC be perpendicular to both CP and CQ. If the area of the triangle OCP is √35 , then a21 + a22 + b21 + b22 2 is equal to __________

Q69.Let m1 and m2 be the slopes of the tangents drawn from the point P(4, 1) to the hyperbola H : 25y2 −x216 = 1 If Q is the point from which the tangents drawn to H have slopes |m1| and |m2| and they make positive (PQ)2 intercepts α and β on the x− axis, then αβ is equal to _______.

Q69.If the line l1 : 3y −2x = 3 is the angular bisector of the lines l2 : x −y + 1 = 0 and l3 : αx + βy + 17 = 0 , then α2 + β2 −α −β is equal to ............

Q69.If m and n respectively are the numbers of positive and negative value of θ in the interval [−π, π] that satisfy the equation cos 2θ cos 2θ = cos 3θ cos 9θ2 , then mn is equal to _____ .

Q70.The line x = 8 is the directrix of the ellipse E : x2 + y2 = 1 with the corresponding focus (2, 0). If the a2 b2 x -axis at tangent to E at the point P in the first quadrant passes through the point (0, 4√3) and intersects the Q, then (3PQ)2 is equal to _____ .

Q70.The vertices of a hyperbola H are (±6, 0) and its eccentricity is √52 . Let N be the normal to H at a point in the first quadrant and parallel to the line √2x + y = 2√2 . If d is the length of the line segment of N between H and the y -axis then d2 is equal to _____ .

Q70.A triangle is formed by X -axis, Y -axis and the line 3x + 4y = 60 . Then the number of points P(a, b) which lie strictly inside the triangle, where a is an integer and b is a multiple of a, is _____ .

Q71.Let the tangent to the parabola y2 = 12x at the point (3, α) be perpendicular to the line 2x + 2y = 3 . Then the square of distance of the point (6, −4) from the normal to the hyperbola α2x2 −9y2 = 9α2 at its point (α −1, α + 2) is equal to .............

Q71.Points P(−3, 2), Q(9, 10) and R(α, 4) lie on a circle C with PR as its diameter. The tangents to C at the points Q and R intersect at the point S . If S lies on the line 2x −ky = 1 , then k is equal to _____ .

Q71.A triangle is formed by the tangents at the point (2, 2) on the curves y2 = 2x and x2 + y2 = 4x, and the line x + y + 2 = 0. If r is the radius of its circumcircle, then r2 is equal to

Q71.Let the eccentricity of an ellipse x2 + y2 = 1 is reciprocal to that of the hyperbola 2x2 −2y2 = 1 . If the a2 b2 ellipse intersects the hyperbola at right angles, then square of length of the latus-rectum of the ellipse is _____. JEE Main 2023 (06 Apr Shift 2) JEE Main Previous Year Paper lim 2 −2 3 2 −2 5 . . . 2 −2 2n+1 )(2 ). (2 )} is equal to

Q73.Let the positive numbers a1, a2, a3, a4 and a5 be in a G.P. Let their mean and variance be 1031 and mn respectively, where m and n are co-prime. If the mean of their reciprocals is 31 and a3 + a4 + a5 = 14, then 10 m + n is equal to ____________.

Q74.The number of relations, on the set {1, 2, 3} containing (1, 2) and (2, 3) which are reflexive and transitive but not symmetric, is _________. . If B = , then the sum of all the elements of the matrix ∑50n=1 Bn is [−1 −1 ] A[ 1 1 ]

Q75.If S = {x ∈R sin−1( √x2+2x+2x+1 ) −sin−1( √x2+1x ) ∑x∈S(sin((x2 + x + 5) π2 ) −cos((x2 + x + 5)π)) is equal to _________.

Q78.Consider a function f : N →R, satisfying f(1) + 2f(2) + 3f(3) + … + xf(x) = x(x + 1)f(x) ; x ≥2 with f(1) = 1 . Then f(2022)1 + f(2028)1 is equal to JEE Main 2023 (29 Jan Shift 2) JEE Main Previous Year Paper (1) 8200 (2) 8000 (3) 8400 (4) 8100

Q78.Let A = {1, 2, 3, 5, 8, 9} . Then the number of possible functions f : A →A such that f(m ⋅n) = f(m) ⋅f(n) for every m, n ∈A with m ⋅n ∈A is equal to ax + bx2, a ≠2b have a common extreme point,

Q78.If domain of the function loge( 6x2+5x+12x−1 ) cos−1( 2x2−3x+43x−5 ) is is equal to JEE Main 2023 (08 Apr Shift 2) JEE Main Previous Year Paper

Q79.Let R = {a, b, c, d, e} and S = {1, 2, 3, 4} . Total number of onto functions f : R →S such that f(a) ≠1, is equal to ________.

Q79.Suppose f is a function satisfying f(x + y) = f(x) + f(y) for all x, y ∈N and f(1) = 51 . If ∑mn=1 n(n+1)(n+2)f(n) = 121 then m is equal to ______.

Q79.Let a curve y = f(x), x ∈(0, ∞) pass through the points P(1, 32 ) and Q(a, 12 ). If the tangent at any point R(b, f(b)) to the given curve cuts the y-axis at the point S(0, c) such that bc = 3, then (PQ)2 is equal to JEE Main 2023 (06 Apr Shift 2) JEE Main Previous Year Paper _____.

Q81.If ∫3 m n2 1 |loge x|dx = n loge( e ), where 3 _____ .

Q81.A person forgets his 4-digit ATM pin code. But he remembers that in the code all the digits are different, the greatest digit is 7 and the sum of the first two digits is equal to the sum of the last two digits. Then the maximum number of trials necessary to obtain the correct code is________.

Q82.Let for x ∈R, S0(x) = x, Sk(x) = Ckx + k ∫x0 Sk−1(t)dt where k = 1, 2, 3, … Then S2(3) + 6C3 is equal to _______. C0 = 1, Ck = 1 −∫10 Sk−1(x)dx,

Q82.If ∫π0 5cos x(1+cos x cos 3x+cos21+5cos xx+cos3 x cos 3x)dx = JEE Main 2023 (01 Feb Shift 2) JEE Main Previous Year Paper

Q82.Let f be a differentiable function defined on [0, π2 ] 2 e ∀x f(x) + ∫x0 f(t)√1 −(loge(f(t)))2dt = ∈[0, π2 ], then {6 loge(f( π6 ))} is equal to