Mathematics and Statistics Board Question Paper 2025-2026 HSC Science (General) 12th Standard Board Exam Question Paper Solution

The converse of contrapositive of ∼p → q is ______.

q → p

∼q → p

p → ∼q

∼q → ∼p

If A = `[(2, -4),(3, 1)]`, then the adjoint of matrix A is ______.

`[(-1, 3),(-4, 1)]`

`[(1, 4),(-3, 2)]`

`[(1, 3),(4, -2)]`

`[(-1, -3),(-4, 2)]`

If tan^–1 (2x) + tan^–1 (3x) = `π/4`, then x = ______.

–1

`1/3`

`1/6`

`3/2`

The angle between the line `vecr = (hati + 2hatj + hatk) + lambda(hati + hatj + hatk)` and the plane `vecr * (2hati - hatj + hatk) = 8` is ______.

`sin^-1 (sqrt(2)/3)`

`sin^-1 (sqrt(3)/2)`

`sin^-1 (1/2)`

`sin^-1 (1/sqrt(2))`

If y = sec (tan⁻¹x), then `dy/dx` at x = 1 is ______.

`1/2`

1

`1/sqrt(2)`

`sqrt(2)`

The approximate value of the function f(x) = x³ – 3x + 5 at x = 1.99 is ______.

6.09

6.91

7.09

7.91

`int_1^2 (1)/(x^2) e^(1/x) * dx` = ______.

`sqrt(e) + 1`

`sqrt(e) - 1`

`sqrt(e)(sqrt(e) - 1)`

`(sqrt(e) - 1)/e`

If the p.d.f. of a continuous r.v. X is

`f(x) = {{:((x  +  2)/18",", "for" -2 < x < 4),(= 0",", "otherwise"):}`

then P(|X| < 1) = ______.

`1/9`

`2/9`

`1/27`

`2/27`

Write the dual of (p ∨ q) ∨ r ≡ p ∨ (q ∨ r)

For the principal value, evaluate of the following:

`cos^-1  1/2 + 2 sin^-1 (1/2)`

Evaluate: `int (2x)/(1 + x^2) dx`

Write the degree of the differential equation

(y")² + 3(y")³ + 3xy' + 5y = 0

Construct the switching circuit of the following:

(∼ p ∧ q) ∨ (p ∧ ∼ r)

In ΔABC, prove that a(b cos C – c cos B) = b² – c².

Find the general solution of the following equation:

4 cos² θ  = 3

Find k, if the sum of the slopes of the lines represented by x² + kxy – 3y² = 0 is twice their product.

Find the value of p, for which the vectors `veca = 3hati + 2hatj + 9hatk` and `vecb = hati + phatj + 3hatk` are perpendicular to each other.

Find the vector equation of the line passing through the points A(1, 2, 3) and B(2, 3, 4).

Find `dy/dx`, if `sqrt(x) + sqrt(y) = sqrt(a)`.

Find `(d^2y)/(dx^2)`, if y = x³ + 7x² – 2x – 9.

Test whether the function f(x) = x³ + 6x² + 12x – 7 is increasing or decreasing for all x ∈ R.

A stone is dropped into a quiet lake and waves in the form of circles are generated. Radius of the circular wave increases at the rate of 3 cm/sec. How fast the area enclosed is increasing when the radius is 8 cm?

`int sqrt(1 + sin2x)  dx`

Given that X ~ B(n, p), if n = 10, E(X) = 8, find Var(X).

Examine whether the statement pattern (p ∧ q) and (∼ p ∨ ∼ q) is a tautology or contradiction or contingency.

In ΔABC, if ∠A = 45°, ∠B = 60° then find the ratio of its sides.

If two of the vertices of a triangle are A (3, 1, 4) and B(– 4, 5, –3) and the centroid of the triangle is at G (–1, 2, 1), then find the coordinates of the third vertex C of the triangle.

If D, E, F are the midpoints of the sides BC, CA, AB of a triangle ABC, prove that `bar"AD" + bar"BE" + bar"CF" = bar0`.

Show that the lines `vecr = (hati + hatj - hatk) + lambda(2hati - 2hatj + hatk)` and `vecr = (4hati - 3hatj + 2hatk) + µ(hati - 2hatj + 2hatk)` intersect each other.

Find the cartesian equation of the plane `vecr = (hati - hatj) + λ(hati + hatj + hatk) + µ(hati - 2hatj + 3hatk)`.

If y = f(u) is a differentiable function of u and u = g(x) is a differentiable function of x then prove that y = f(g(x)) is a differentiable function of x and `(dy)/(dx) = (dy)/(du) * (du)/(dx)`.

Verify Lagrange’s mean value theorem for the following function:

f(x) = log x, on [1, e]

Evaluate the following : `int sinx/(sin 3x).dx`

Solve the D.E. 3e^x tan y dx + (1 + e^x) sec²y dy = 0.

Find expected value and variance of X, where X is number obtained on uppermost face when a fair die is thrown.

A pair of dice is thrown 4 times. If getting a doublet is considered as success, find the probability of two successes.

If A = `[(1, 2),(3, 4)]`, prove that A · (adj A) = (adj A) · A = |A| · I

Show that every homogeneous equation of degree two in x and y, i.e., ax² + 2hxy + by² = 0, represents a pair of lines passing through the origin, if h² – ab ≥ 0.

Let `A(bara)` and `B(barb)` are any two points in the space and `"R"(bar"r")` be a point on the line segment AB dividing it internally in the ratio m : n, then prove that `barr = (mbarb + nbara)/(m + n)`.

Solve the L.P.P. graphically:

Minimize: z = 5x + 2у,

Subject to: 5x + y ≥ 10, x + y ≥ 6, 

                  x ≥ 0, y ≥ 0

Evaluate: `int (3x^2 + 4x - 5)/((x^2 - 1)(x + 2)) dx`

Prove that: `int_a^b f(x)dx = int_a^b f(a + b - x) * dx`. Hence, find `int_(π/6)^(π/3) sin^2x * dx`

Solve the following:

Find the area enclosed between the circle x² + y² = 1 and the line x + y = 1, lying in the first quadrant.

Solve the following differential equation:

`x^2 dy/dx = x^2 + xy + y^2`