CBSE Class 12 Mathematics Sample Paper Set O

See below CBSE Class 12 Mathematics Sample Paper Set O with solutions. We have provided CBSE Sample Papers for Class 12 Mathematics as per the latest paper pattern issued by CBSE for the current academic year. All sample papers provided by our Class 12 Mathematics teachers are with answers. You can see the sample paper given below and use them for more practice for Class 12 Mathematics examination.

1. Let P(4, – 4) and Q(9, 6) be two points on the parabola, y x 2 = 4 and let X be any point on the arc P O Q of this parabola, where O is the vertex of this parabola, such that the area of Δ P X Q is maximum. Then, this maximum area (in sq units) is
(a)125/2
(b)75/2
(c)625/4
(d)125/4

2. Consider three boxes, each containing 10 balls labelled 1, 2, …, 10. Suppose one ball is randomly drawn from each of the boxes. Denote by ni, the label of the ball drawn from the ith box,(i = 1, 2, 3). Then, the number of ways in which the balls can be chosen such that n₁<n₂<n₃ is
(a) 82
(b) 120
(c) 240
(d) 164

3. Let y = y(x) be the solution of the differential equation,

(a) – e/2
(b) – e²/2
(c)e/4
(d)e²/4

4. The sum of the distinct real values of

(a) 2
(b) 0
(c) 1
(d) – 1

5. Let C₁ and C₂ be the centres of the circles x2+Y2-2X-2Y-2=0 and x2+Y2-6X-6Y+14=0 respectively.
If P andQ are the points of intersection of these circles, then the area (in sq units) of the quadrilateral PC₁ QC₂ is
(a) 8
(b) 4
(c) 6
(d) 9

6. If the straight line, 2x – 3y + 17 = 0 is perpendicular to the line passing through the points (7, 17) and (15, β),then β equals
(a) 35/3
(b) – 5
(c) – 35/3
(d) 5

7. A ratio of the 5th term from the beginning to the 5th term from the end in the binomial expansion of

8. Let S = {1, 2, 3, … , 100}. The number of non-empty subsets A of S such that the product of elements in A is even, is
(a) 2⁵⁰ (2⁵⁰– )
(b) 2⁵⁰ -1
(c) 2⁵⁰ +1
(d) 2 ¹⁰⁰ -1

9. The maximum area (in sq. units) of a rectangle having its base on the X-axis and its other two vertices on the parabola, y = 12 – x2 such that the rectangle lies inside the parabola, is
(a) 36
(b) 20√2
(c)32
(d) 18√3

10.

11. 

(a) 4√2
(b) 4
(c) 8
(d) 8√2

12. An ordered pair (a, b) for which the system of linear equations
(1 + a)x + by + z = 2
ax + (1 + b)y + z = 3
ax + by + 2z = 2
has a unique solution, is
(a) (2, 4)
(b) (- 4, 2)
(c) (1, – 3)
(d) (-3, 1)

13. If the sum of the deviations of 50 observations from 30 is 50, then the mean of these observations is
(a) 50
(b) 30
(c) 51
(d) 31

14.

15. The maximum value of 3 cosθ+5 sin (θ-π/6) for any real value of θ is
(a)√79/2
(b) √34
(c) √31
(d) √19

16. The area (in sq units) of the region bounded by the parabola, y = x² + 2 and lines, y = x + 1, x = 0 and x = 3, is
(a)15/2
(b)17/4
(c)21/2
(d)15/4

17. 

18. If a variable line, 3x + 4y – λ = 0 is such that the two circles x²+Y²-2X-2Y+1=0 and x²+Y²-18X-2Y+78=0  are on its opposite sides, then the set of all values of λ is the interval
(a) [13, 23]
(b) (2, 17)
(c) [12, 21]
(d) (23, 31)

19. The perpendicular distance from the origin to the plane containing the two lines,

(a) 11√6
(b)11/√6
(c) 11
(d) 6 √11

20. If λ be the ratio of the roots of the quadratic equation in x,3m²x²+m(m-4)x+2=0,then the least value of m for which λ+1/λ=1,
(a) – 2 + √2
(b) 4 – 2 √3
(c) 4 – 3 √2
(d) 2 – √3

21. Considering  only the principal values of inverse functions, the set

(a) is an empty set
(b) is a singleton
(c) contains more than two elements
(d) contains two elements

22. If the vertices of a hyperbola be at (-2, 0) and (2,0) and one of its foci be at (-3, 0), then which one of the following points does not lie on this hyperbola?
(a) (2 √6, 5)
(b) (6, 5 √2)
(c) (4, √15)
(d) (- 6, 2 √10)

23. If z-α/z+α(α∈ R)is a purely imaginary number and|z| = 2, then a value of α is
(a) √2
(b)1/2
(c) 1
(d) 2 B

24.

(a) 10
(b) 135
(c) 9
(d) 15

25. In a random experiment, a fair die is rolled until two fours are obtained in succession. The probability that the experiment will end in the fifth throw of the die is equal to
(a)175/65
(b)225/65
(c)200/65
(d)150/65

26. Let S be the set of all points in (- π, π) at which the function,
f (x) = min {sin x, cos x} is not differentiable. Then, S is a subset of which of the following?

27. A tetrahedron has vertices P(1, 2, 1), Q(2, 1, 3), R(- 1, 1, 2) and O(0, 0, 0). The angle between the faces O P Q and PQR is

28. The product of three consecutive terms of a GP is 512. If 4 is added to each of the first and the second of these terms, the three terms now form an AP. Then, the sum of the original three terms of the given GP is
(a) 36
(b) 28
(c) 32
(d) 24

29.

(a) 156
(b) 301
(c) 283
(d) 303

30. Let f and g be continuous functions on [0, a] such that f (x) = f (a – x) and g(x) + g(a – x) = 4, then