Practice Questions

Q65.The sum of the rational terms in the binomial expansion of 1 1 10 is : 2 + 3 5 ) (2 (1) 25 (2) 32 (3) 9 (4) 41

Q66.If the 7th term in the binomial expansion of 9 , x > 0 , is equal to 729 , then x can be: + √3 ln x) ( 3√843 (1) e2 (2) e (3) e (4) 2e 2

Q66.The number of solutions of the equation sin 2x −2 cos x + 4 sin x = 4 in the interval [0, 5π] is : (1) 3 (2) 5 (3) 4 (4) 6

Q66.The ratio of the coefficient of x15 to the term independent of x in the expansion of (x2 + x ) is: (1) 7 : 16 (2) 7 : 64 (3) 1 : 4 (4) 1 : 32

Q66.The sum of first 20 terms of the sequence 0. 7, 0. 77, 0. 777, . . . . . . , is : (1) 81 7 (179 + 10−20) (2) 97 (99 + 10−20) (3) 81 7 (179 −10−20) (4) 97 (99 −10−20)

Q67.If two lines L1 and L2 in space, are defined by L1 = {x = √λy + (√λ −1), z = (√λ −1)y + √λ} and L2 = {x = √μy + (1 −√μ), z = (1 −√μ)y + √μ} then L1 is perpendicular to L2 , for all nonnegative reals λ and μ, such that : (1) √λ + √μ = 1 (2) λ ≠μ (3) λ + μ = 0 (4) λ = μ

Q67.A value of x for which sin (cot−1(1 + x)) = cos (tan−1 x), is : (1) −12 (2) 1 (3) 0 (4) 1 2

Q67.The number of solutions of the equation, sin−1 x = 2 tan−1 x (in principal values) is : (1) 1 (2) 4 (3) 2 (4) 3

Q67.The term independent of x in the expansion of 10 ( x2/3−x1/3+1x+1 − x−x1/2x−1 ) is (1) 210 (2) 310 (3) 4 (4) 120

Q67.Let A = {θ : sin(θ) = tan(θ)} and B = (θ : cos(θ) = 1\} be two sets. Then: (1) A = B (2) A ⊄ B (3) B ⊄ A (4) A ⊂B and B −A ≠ϕ

Q68.A light ray emerging from the point source placed at P(1, 3) is reflected at a point Q in the axis of x. If the reflected ray passes through the point R (6, 7), then the abscissa of Q is: (1) 1 (2) 3 (3) 7 (4) 5 2 2

Q68.If the image of point P(2, 3) in a line L is Q(4, 5), then the image of point R(0, 0) in the same line is: (1) (2, 2) (2) (4, 5) (3) (3, 4) (4) (7, 7)

Q68.Let θ1 be the angle between two lines 2x + 3y+ c1 = 0 and −x + 5y + c2 = 0 and θ2 be the angle between two lines 2x + 3y + c1 = 0 and −x + 5y+ c3 = 0, where c1, c2, c3 are any real numbers : Statement-1: If c2 JEE Main 2013 (23 Apr Online) JEE Main Previous Year Paper and c3 are proportional, then θ1 = θ2 . Statement-2: θ1 = θ2 for all c2 and c3 . (1) Statement-1 is true, Statement-2 is true; (2) Statement-1 is true, Statement-2 is true; Statement-2 is a correct explanation of Statement-2 is not a correct explanation of Statement-1. Statement-1. (3) Statement-1 is false; Statement- 2 is true. (4) Statement-1 is true; Statement- 2 is false.

Q69.If the three lines x −3y = p, ax + 2y = q and ax + y = r form a right-angled triangle then : (1) a2 −9a + 18 = 0 (2) a2 −6a −12 = 0 (3) a2 −6a −18 = 0 (4) a2 −9a + 12 = 0

Q69.A ray of light along x + √3y = √3 gets reflected upon reaching X−axis, the equation of the reflected ray is (1) y = √3x −√3 (2) √3y = x −1 (3) y = x + √3 (4) √3y = x −√3

Q69.Let x ∈(0, 1). The set of all x such that sin−1 x > cos−1 x, is the interval: 1 (1) (2) 1 , ( 2 , √21 ) ( √2 1) (3) (0, 1) (4) √3 2 (0, )

Q70.If each of the lines 5x + 8y = 13 and 4x −y = 3 contains a diameter of the circle x2 + y2 −2 (a2 −7a + 11) x −2 (a2 −6a + 6)y + b3 + 1 = 0, then : (1) a = 5 and b ∉(−1, 1) (2) a = 1 and b ∉(−1, 1) (3) a = 2 and b ∉(−∞, 1) (4) a = 5 and b ∈(−∞, 1)

Q70.The acute angle between two lines such that the direction cosines l, m, n, of each of them satisfy the equations l + m + n = 0 and l2 + m2 −n2 = 0 is : (1) 15∘ (2) 30∘ (3) 60∘ (4) 45∘

Q70.Statement 1: The only circle having radius √10 and a diameter along line 2x + y = 5 is x2 + y2 −6x +2y = 0 . Statement 2 : 2x + y = 5 is a normal to the circle x2 + y2 −6x + 2y = 0 . (1) Statement 1 is false; Statement 2 is true. (2) Statement 1 is true; Statement 2 is true, Statement 2 is a correct explanation for Statement 1. (3) Statement 1 is true; Statement 2 is false. (4) Statement 1 is true; Statement 2 is true; Statement 2 is not a correct explanation for Statement 1.

Q70.The point of intersection of the normals to the parabola y2 = 4x at the ends of its latus rectum is : (1) (0, 2) (2) (3, 0) (3) (0, 3) (4) (2, 0)

Q71.Statement-1: The slope of the tangent at any point P on a parabola, whose axis is the axis of x and vertex is at the origin, is inversely proportional to the ordinate of the point P. Statement-2: The system of parabolas y2 = 4ax satisfies a differential equation of degree 1 and order 1. JEE Main 2013 (09 Apr Online) JEE Main Previous Year Paper (1) Statement-1 is true; Statement- 2 is true; (2) Statement-1 is true; Statement-2 is true; Statement-2 is a correct explanation for Statement- 2 is not a correct explanation for statement-1. statement-1. (3) Statement-1 is true; Statement- 2 is false. (4) Statement-1 is false; Statement- 2 is true.

Q71.A tangent to the hyperbola x2 meets x-axis at P and y-axis at Q. Lines PR and QR are drawn such 4 −y22 = 1 that OPRQ is a rectangle (where O is the origin). Then R lies on : (1) 4 + 2 = 1 (2) 2 − 4 = 1 x2 y2 x2 y2 (3) 2 + 4 = 1 (4) 4 − 2 = 1 x2 y2 x2 y2

Q71.If a circle of unit radius is divided into two parts by an arc of another circle subtending an angle 60∘ on the circumference of the first circle, then the radius of the arc is: JEE Main 2013 (25 Apr Online) JEE Main Previous Year Paper (1) √3 (2) 12 (3) 1 (4) None of these

Q71.The circle passing through (1, −2) and touching the axis of x at (3, 0) also passes through the point (1) (5, −2) (2) (−2, 5) (3) (−5, 2) (4) (2, −5)

Q72.For integers m and n, both greater than 1, consider the following three statements : P : m divides n Q : m divides n2 R : m is prime, then (1) Q ∧R →P (2) P ∧Q →R (3) Q →R (4) Q →P