12th Maths Question Paper 2024 Maharashtra Board Pdf

Maharashtra State Board Class 12th Maths Question Paper 2024 with Solutions Answers Pdf Download.

Class 12 Maths Question Paper 2024 Maharashtra State Board with Solutions

Time: 3 Hrs.
Max. Marks: 80

General Instructions: The question paper is divided into FOUR sections.

  1. Section A: Q.1 contains Eight multiple choice type of questions, each carrying Two marks.
    Q.2 contains Four very short answer type questions, each carrying one mark.
  2. Section B: Q.3 to Q. 14 contain Twelve short answer type questions, each carrying Two marks. (Attempt any Eight)
  3. Section C: Q.15 to Q.26 contain Twelve short answer type questions, each carrying Three marks. (Attempt any Eight)
  4. Section D: Q. 27 to Q.34 contain Eight long answer type questions, each carrying Four marks. (Attempt any Five)
  5. Use of log table is allowed. Use of calculator is not allowed.
  6. Figures to the right indicate full marks.
  7. Use of graph paper is not necessary. Only rough sketch of graph is expected.
  8. For each multiple choice type of question, Only the first attempt will be considered for evaluation.
  9. Start answer to each section on a new page.

Section – A

Question 1.
Select and write the correct answer for the following multiple choice type of questions: [16]

(i) The dual of statement t ∨ (p ∨ q) is ……….. (2)
(a) c ∧ (p ∨ q)
(b) c ∧ (p ∧ q)
(c) t ∧ (p ∧ q)
(d) t ∧ (p ∨ q)
Answer:
(b) c ∧ (p ∧ q)
To obtain the dual of a statement, we replace ‘∨’ with ‘∧’ and ‘t’ with ‘c’
∴ The dual of statement t ∨ (p ∨ q) is c ∧ (p ∧ q).

(ii) The principle solutions of the equation cos θ = \(\frac{1}{2}\) are ………. (2)
(a) \(\frac{\pi}{6}, \frac{5 \pi}{6}\)
(b) \(\frac{\pi}{6}, \frac{7 \pi}{6}\)
(c) \(\frac{\pi}{3}, \frac{5 \pi}{3}\)
(d) \(\frac{\pi}{3}, \frac{2 \pi}{6}\)
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 2

(iii) If α, β, γ are direction angles of a line and α = 60°, β = 45°, then γ = _____. (2)
(a) 30° or 90°
(b) 45° or 60°
(c) 90° or 130°
(d) 60° or 120°
Answer:
(d) 60° or 120°
Given that ∝ = 60°, β = 45°, γ = ?
We know that,
cos2 ∝ + cos2 β + cos2 γ = 1
[Properties of direction angle]
⇒ cos2 (60°) + cos2 (45°) + cos2 γ = 1
⇒ \(\left(\frac{1}{2}\right)^2\) + \(\left(\frac{1}{\sqrt{2}}\right)^2\) + cos2 γ = 1
⇒ \(\frac{1}{4}+\frac{1}{2}\) + cos2 γ = 1
⇒ cos2 γ = 1 – \(\frac{3}{4}\)
⇒ cos2 γ = \(\frac{1}{4}\)
⇒ cos γ = ±\(\frac{1}{2}\)
⇒ cos γ = \(\frac{1}{2}\)
or cos γ = –\(\frac{1}{2}\)
cos γ = cos\(\frac{\pi}{3}\)
or cos γ = – cos\(\frac{\pi}{3}\)
⇒ γ = \(\frac{\pi}{3}\)
or cos γ = cos[π – \(\frac{\pi}{3}\)]
⇒ γ = π – \(\frac{\pi}{3}\)
γ = \(\frac{2 \pi}{3}\)
γ = \(\frac{\pi}{3}\) = 60°
or γ = \(\frac{2 \pi}{3}\) = 120°
Hence, γ = 60° or 120°.

12th Maths Question Paper 2024 Maharashtra Board Pdf

(iv) The perpendicular distance of the plane \(\bar{r}\).(3\(\hat{i}\) +4\(\hat{j}\) +12\(\hat{k}\)) = 78, from the origin is ____. (2)
(a) 4
(b) 5
(c) 6
(d) 8
Answer:
(c) 6
12th Maths Question Paper 2024 Maharashtra Board Pdf 3

(v) The slope of the tangent to the curve x = sin θ and u = cos 2θ at θ = \(\frac{\pi}{6}\) is ____.
(a) \(-2 \sqrt{3}\)
(b) \(\frac{-2}{\sqrt{3}}\)
(c) -2
(d) \(-\frac{1}{2}\)
Answer:
(c) -2
Given, x = sin θ and y = cos 2θ
On differentiate w.r.t θ, we get
12th Maths Question Paper 2024 Maharashtra Board Pdf 4

(vi) If \(\int_{\frac{-\pi}{4}}^{\frac{\pi}{4}} x^3 \cdot \sin ^4 x d x\) = k then k = _____. (2)
(a) 1
(b) 2
(c) 4
(d) 0
Answer:
(d) 0
Let f(x) = x3 . sin4x
∴ f(- x) = [-x]3 [sin(-x)]4
∴ = -x3(-sin x)4
∴ = -f(x).
∴ f(x) is on odd function.
⇒ \(\int_{-\pi / 4}^{\pi / 4}\)x3.sin4 x dx = 0
[∵ F(x) is an odd number]
k = 0

(vii) The integrating factor of linear differential equation x\(\frac{d y}{d x}\) + 2y = x2 log x is ___. (2)
(a) x
(b) \(\frac{1}{x}\)
(c) x2
(d) \(\frac{1}{x^2}\)
Answer:
(c) x2
\(\frac{d y}{d x}\) + 2y = x2log x
Given. \(\frac{d y}{d x}+\frac{2}{x} y\) = x log x
Here p = \(\frac{2}{x}\)
Thus integrating factor is.
I.F. = \(e^{\int \mathrm{Pd} d x}\) = \(e^{\int \frac{2}{x} d x}\)
= \(e^{2 \log x}\)
= x2

12th Maths Question Paper 2024 Maharashtra Board Pdf

(viii) If the mean and variance of a binomial distribution are 18 and 12 respectively, then the value of n is ___. (2)
(a) 36
(b) 54
(c) 18
(d) 27
Answer:
(b) 54
Mean = np = 18 …….. (i)
variance = npq = 12 …….. (ii)
Equation (ii) divide by equation (i), we get
So, \(\frac{n p q}{n p}\) = \(\frac{12}{18}\)
∴ q = \(\frac{2}{3}\)
Now, p = 1 – q = 1 – \(\frac{2}{3}\)
∴ p = \(\frac{1}{3}\).
Put the value of p in equation (i).
np = 18
⇒ n[latex]\frac{1}{3}[/latex] = 18
⇒ n = 54

Question 2.
Answer the following questions: [4]

(i) Write the compound statement ‘Nagpur is in Maharashtra and Chennai is in Tamilnadu symbolically. (1)
Answer:
Let p : Nagpur is in Maharashtra
q : Chennai is in Tamilnadu
∴ The symbolic form of the given statement is [p ∧ q]

(ii) If the vectors 2\(\hat{i}\) – 3\(\hat{j}\) + 4\(\hat{k}\) and p\(\hat{i}\) + 6\(\hat{j}\) – 8\(\hat{k}\) are collinear, then find the value of p. (1)
Answer:
The given vectors are 2\(\hat{i}\) – 3\(\hat{j}\) + 4\(\hat{k}\) and p\(\hat{i}\) + 6\(\hat{j}\) – 8\(\hat{k}\)
According to the question,
∴ The given vectors are collinear
12th Maths Question Paper 2024 Maharashtra Board Pdf 5

(iii) Evaluate : ∫\(\frac{1}{x^2+25}\)dx
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 6

(iv) A particle is moving along X-axis. Its acceleration at time t is proportional to its velocity at that time. Find the differential equation of the motion of the particle.
Answer:
Let x be the distance travelled by the partide at time t.
Now,
the velocity is given by \(\frac{d x}{d t}\) and acceleration is given by \(\frac{d^2 x}{d t^2}\)
According to the question.
\(\frac{d^2 x}{d t^2}\) \(\frac{d x}{d t}\) ∝
\(\frac{d^2 x}{d t^2}\) = k.\(\frac{d x}{d t}\)
where k is a constant of proportionalitly.
This is the required differential equation.

Section – B

Attempt any EIGHT of the following questions:

Question 3.
Construct the truth table for the statement pattern: (2)
[(p → q ∧ q] → p
Answer:
Construct the truth table for the statement attern [(p → q) ∧ q] → p
12th Maths Question Paper 2024 Maharashtra Board Pdf 7

Question 4.
Check whether the matrix \(\left[\begin{array}{rr}
\cos \theta & \sin \theta \\
-\sin \theta & \cos \theta
\end{array}\right]\) is invertible or not. (2)
Answer:
Let A = \(\left[\begin{array}{rr}
\cos \theta & \sin \theta \\
-\sin \theta & \cos \theta
\end{array}\right]\)
then, |A| = \(\left|\begin{array}{rr}
\cos \theta & \sin \theta \\
-\sin \theta & \cos \theta
\end{array}\right|\)
= cos2θ – (-sin2θ)
= cos2θ + sin2θ
= 1 ≠ 0
∴ A is a non-singular matrix.
Hence, matrix A is invertible.

Question 5.
In ∆ABC, if a = 18, b = 24 and c = 30 then find the value of sin\(\left(\frac{A}{2}\right)\). (2)
Answer:
Given : a = 18, b = 24 and c = 30
12th Maths Question Paper 2024 Maharashtra Board Pdf 8

Question 6.
Find k, if the sum of the slopes of the lines represented by x2 + kxy – 3y2 = 0 is twice their product. (2)
Answer:
On comparing the given equation x2 + kxy – 3y2 = 0 with ax2 + 2hxy + by2 = 0
we get, a = 1, 2h = k and b = -3
Let m1 and m2 be the stopes of the lines represented by x2 + kxy – 3y2 = 0
∴ m1 + m2 = \(\frac{-2 h}{b}\) = \(\frac{-k}{-3}\) = \(\frac{k}{3}\)
and m1m2 = \(\frac{a}{b}\) = \(\frac{1}{-3}\) = \(-\frac{1}{3}\)
According to the question,
m1 + m2 = 2[m1m2]
∴ \(\frac{k}{3}\) = -2\(\left[\frac{-1}{3}\right]\)
∴ k = -2

Question 7.
If \(\bar{a}, \bar{b}, \bar{c}\) are the position vectors of the points A, B, C respectively and 5\(\bar{a}\) – 3\(\bar{b}\) – 2\(\bar{c}\) = \(\bar{0}\), then find the ratio in which the point C divides the line segment BA. (2)
Answer:
The given vector is 5\(\bar{a}\) – 3\(\bar{b}\) – 2\(\bar{c}\) = 0
∴ 2\(\bar{c}\) = 5\(\bar{a}\) – 3\(\bar{b}\)
∴ \(\bar{c}\) = \(\frac{5 \bar{a}-3 \bar{b}}{2}\)
∴ \(\bar{c}\) = \(\frac{5 \bar{a}-3 \bar{b}}{5-3}\)
∴ The point c divides the line segment BA externally in ratio 5 : 3.

Question 8.
Find the vector equation of the line passing through the point having position vector 4\(\hat{i}\) – \(\hat{j}\) + 2\(\hat{k}\) and parallel to the vector -2\(\hat{i}\) – \(\hat{j}\) + \(\hat{k}\). (2)
Answer:
The vector equation of a line passing through a point with position vector \(\bar{a}\) and parallel to \(\bar{b}\) is \(\bar{r}\) = \(\bar{a}\) + λ\(\bar{b}\).
∴ The vector equation of the line passing through the point having position vector 4\(\hat{i}\) – \(\hat{j}\) + 2\(\hat{k}\) and parallel to the vector -2\(\hat{i}\) – \(\hat{j}\) + \(\hat{k}\) is r
= [4\(\hat{i}\) – \(\hat{j}\) + 2\(\hat{k}\)] + λ[-2\(\hat{i}\) – \(\hat{j}\) + \(\hat{k}\)]
⇒ \(\bar{r}\) = (4 – 2λ)\(\hat{i}\) + \(\hat{j}\)(-1 – λ)\(\hat{k}\)(2 + λ)

12th Maths Question Paper 2024 Maharashtra Board Pdf

Question 9.
Find \(\frac{d y}{d x}\), if y = (log x)x. (2)
Answer:
y = (log x)x
log y = log(log x)x
∴ log y = xlog(log x)
Now, differentiate w.r.t. x, we get
12th Maths Question Paper 2024 Maharashtra Board Pdf 9

Question 10.
Evaluate: ∫log x dx (2)
Answer:
I = ∫log x . 1 dx
Let u = log x and v = 1 dx
From integrating by ports
12th Maths Question Paper 2024 Maharashtra Board Pdf 11

Question 11.
Evaluate: \(\int_0^{\frac{\pi}{2}} \cos ^2 x d x\) (2)
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 12

Question 12.
Find the area of the region bounded by the curve y = x2, and the lines x = 1, x = 2 and y = 0. (2)
Answer:
The given equation of the curve is y = x2
12th Maths Question Paper 2024 Maharashtra Board Pdf 13

Question 13.
Solve: 1 + \(\frac{d y}{d x}\) = cosec(x + y) ; put x + y = u (2)
Answer:
Given, (x + u) = u ……….. (i)
On differentiate equation (i) w.r.t. x, we get
∴ 1 + \(\frac{d y}{d x}\) = \(\frac{d u}{d x}\)
∴ Given differential equation becomes —
\(\frac{d u}{d x}\) = cosec u
12th Maths Question Paper 2024 Maharashtra Board Pdf 14
⇒ sin u du = dx
On integrating both sides, we get
∴ ∫sinu . du = ∫dx
⇒ -cos u = x + c
⇒ x + cos u + c = 0
∴ x + cos[x + y] + c = 0. (From equation (i))

Question 14.
If two coins are tossed simultaneously, write the probability distribution of the number of heads. (2)
Answer:
When 2 coins are tossed then the sampLe space is
S = {HH, HT, TH, TT}
Let X be the number of heads in 2 tosses of a coins.
∴ X[HH]= 2, X[HT] = 1, X[TH] = 1, X[TT] = 0
So, X can take the value of 0, 1 and 2.
It is known that,
P[HH] = P[HT] = P[TH] = P[TT] = \(\frac{1}{4}\)
P[X = 0] = P[TT] = \(\frac{1}{4}\)
P[X = 1] = P[TH] + P[HT] = \(\frac{1}{4}\) + \(\frac{1}{4}\) = \(\frac{1}{2}\)
P(X = 2) = P[HH] = \(\frac{1}{4}\)
Thus, the required probobility distribution is as follows:
12th Maths Question Paper 2024 Maharashtra Board Pdf 15

Section – C

Attempt any EIGHT of the following questions: [24]

Question 15.
Express the following switching circuit in the symbolic form of logic. Construct the switching table: (3)
12th Maths Question Paper 2024 Maharashtra Board Pdf 1
Answer:
Let p : The switch S1
q : The switch S2
Therefore, the symbolic form of the circuit is
[p ∨ q] ∧ [~p ∧ ~q].
Switching table:
12th Maths Question Paper 2024 Maharashtra Board Pdf 16
Therefore, irrespective to the entries of the last column the lamp will not glow.

12th Maths Question Paper 2024 Maharashtra Board Pdf

Question 16.
Prove that: tan-1\(\left(\frac{1}{2}\right)\) + tan-1\(\left(\frac{1}{3}\right)\) = \(\frac{\pi}{4}\) (3)
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 17

Question 17.
In ∆ABC, prove that:
\(\frac{\cos \mathrm{A}}{a}\) + \(\frac{\cos \mathrm{B}}{b}\) + \(\frac{\cos \mathrm{C}}{c}\) = \(\frac{a^2+b^2+c^2}{2 a b c}\) (3)
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 18

Question 18.
Prove by vector method, the angle subtended on a semicircle is a right angle. (3)
Answer:
Let segment AB be a diameter of o circle with centre C and P be any point on the circle other than A and B.
Then ∠APB is on angle subtended on a semicircle.
12th Maths Question Paper 2024 Maharashtra Board Pdf 19
12th Maths Question Paper 2024 Maharashtra Board Pdf 20
∴ ∠APB is a right angle.
Hence, the angle subtended on a semicircle is the right angle.
Hence Proved.

Question 19.
Find the shortest distance between the lines \(\bar{r}\) = (4\(\hat{i}\) – \(\hat{j}\)) + λ(\(\hat{i}\) + 2\(\hat{j}\) – 3\(\hat{k}\)) and \(\bar{r}\) = (\(\hat{i}\) – \(\hat{j}\) – 2\(\hat{k}\)) + μ(\(\hat{i}\) + 4\(\hat{j}\) – 5\(\hat{k}\))
Answer:
Equation of lines are,
12th Maths Question Paper 2024 Maharashtra Board Pdf 21

12th Maths Question Paper 2024 Maharashtra Board Pdf

Question 20.
Find the angle between the line \(\bar{r}\) = (\(\hat{i}\) + 2\(\hat{j}\) + \(\hat{k}\)) + λ(\(\hat{i}\) + \(\hat{j}\) + \(\hat{k}\)) and the plane \(\bar{r}\).(2\(\hat{i}\) + \(\hat{j}\) + \(\hat{k}\)) = 8.
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 22

Question 21.
If y = sin-1 x, then show that: (1 – x2)\(\frac{d^2 y}{d x^2}\) – x.\(\frac{d y}{d x}\) = 0.
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 23

Question 22.
Find the approximate value of tan-1 (1.002). [Given: π = 3.1416] (3)
Answer:
Let, f(x) = tan-1x
⇒ f'(x) = \(\frac{1}{1+x^2}\)
∴ x = 1.002 = 1 + 0.002 = [a + h]
Here, a = 1 and h = 0.002
12th Maths Question Paper 2024 Maharashtra Board Pdf 24

Question 23.
Prove that: \(\int \frac{1}{a^2-x^2} d x\) = \(\frac{1}{2 a} \log \left(\frac{a+x}{a-x}\right)+c\) (3)
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 25

Question 24.
Solve the differential equation:
x.\(\frac{d y}{d x}\) – y + x.sin\(\left(\frac{y}{x}\right)\) = 0.
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 26

Question 25.
Find k, if
f(x) = kx2 (1 – x), for 0 < x < 1,
= 0 otherwise
is the p.d.f of random variable X. (3)
Answer:
The p.d.f. of a continuous random variable must satisfies the following condition
12th Maths Question Paper 2024 Maharashtra Board Pdf 27

Question 26.
A die is thrown 6 times, if ‘getting an odd number’.is success, find the probability of 5 successes. (3)
Answer:
The repeated tosses of a die are Bernoulli trails. Let X denote the number of success of getting odd numbers in an expêriment of 6 traits.
Probability of getting an odd number in a single throw of a die is P = \(\frac{3}{6}\) = \(\frac{1}{2}\)
∴ q = 1 – P = \(\frac{1}{2}\)
X has a binomial distribution.
12th Maths Question Paper 2024 Maharashtra Board Pdf 28

Section – D

Attempt any FIVE of the following questions: [20]

Question 27.
Solve the following system of equations by the method of reduction : x + y + z = 6, y + 3z = 11, x + z = 2y. (4)
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 29
⇒ x + y + z = 6 ……… (i)
and y + 3z = 11 ……. (ii)
and -3y = -6 …… (iii)
Put the value of y in equation (ii)
2 + 3z = 11
3z = 9
⇒ z = 3
Put the value of y and z in equation (1)
x + 2 + 3 = 6
x + 5 = 6
x = 1
Therefore, x = 1, y = 2, z = 3.

12th Maths Question Paper 2024 Maharashtra Board Pdf

Question 28.
Prove that the acute angle θ between the lines represented by the equation ax2 + 2hxy + by2 = 0 is tanθ = \(\left|\frac{2 \sqrt{h^2-a b}}{a+b}\right|\). Hence find the condition that the lines are coincident. (4)
Answer:
Case 1 : Let m1 and m2 are the slopes of the ones represented by the equation ax2 + 2hxy + by2 = 0
then m1 + m2 = \(\frac{-2 h}{b}\) and m1m2 = \(\frac{a}{b}\)
If θ is the acute angle between the lines,
then, tan θ = \(\left|\frac{m_1-m_2}{1+m_1 m_2}\right|\)
Now, (m1 – m2)2 = (m1 + m2)2 – 4m1m2
12th Maths Question Paper 2024 Maharashtra Board Pdf 30

Case 2 : If one of the tines is parallel to the y-axis then one of the slope m1. m2 does not exist. As the line passes through the origin so one line parallel to the y-axis. Its equation is x = 0 and b = 0
The other line is ax + 2by = 0, where slope is
12th Maths Question Paper 2024 Maharashtra Board Pdf 41

Question 29.
Find the volume of the parallelopiped whose vertices are A(3, 2, -1), B(-2, 2, -3), C(3, 5, -2) and D(-2, 5, 4). (4)
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 32

Question 30.
Solve the following LP.P. by graphical method:
Maximize: z = 10x + 25y
Subject to : 0 ≤ x ≤ 3,
0 ≤ y ≤ 3,
x + y ≤ 5.
Also find the maximum value of z. (4)
Answer:
The given inequations are 0 ≤ x ≤ 3; 0 ≤ y ≤ 3; x + y ≤ 5.
12th Maths Question Paper 2024 Maharashtra Board Pdf 33
The shaded region OABCD is the feasible region with the vertices O.A. B.C and D
12th Maths Question Paper 2024 Maharashtra Board Pdf 34
The maximum of z = 10x + 25y is 95 at the point C[2, 3].

Question 31.
If x = f(t) and y = g(t) are differentiable functions of t, so that y is function of x and \(\frac{d x}{d t}\) ≠ 0 then prove that \(\frac{d y}{d x}\) = \(\frac{\frac{d y}{d t}}{\frac{d x}{d t}}\). Hence, find \(\frac{d y}{d x}\), if x = at2, y = 2at. (4)
Answer:
Given, x and y are differentiable functions of t. Let there be a small increment δt in the value of t. At the value of x and y taking δx, δy respectively.
12th Maths Question Paper 2024 Maharashtra Board Pdf 35

Question 32.
A box with a square base is to have an open top. The surface area of box is 147 sq.cm. What should be its dimensions in order that the volume is largest? (4)
Answer:
Let x cm be side of square base and h cm be its height
Then x2 + 4xh = 147
12th Maths Question Paper 2024 Maharashtra Board Pdf 36
Hence, the volume of the box is largest, when the side of square bose is 7 cm and its height is 3.5 cm.

Question 33.
Evaluate: \(\int \frac{5 e^x}{\left(e^x+1\right)\left(e^{2 x}+9\right)} d x\) (4)
Answer:
12th Maths Question Paper 2024 Maharashtra Board Pdf 37
= At2 + 9A + Bt2 + Bt + Ct + C
1 = (A + B)t2 + (B + C)t + (9A + C).
9A + C = 1 ………. (i)
A + B = 0 ………. (ii)
B + C = 0 ………(iii)
⇒ C = -B
Put in equation (ii)
9A – B = 1
A + B = 0
On solving, we get
10A = 1
⇒ A = \(\frac{1}{10}\)
B = \(\frac{-1}{10}\)
and C = \(\frac{1}{10}\)
Put the value A, B and C in equation (i)
12th Maths Question Paper 2024 Maharashtra Board Pdf 38

12th Maths Question Paper 2024 Maharashtra Board Pdf

Question 34.
Prove that
\(\int_0^{2 a} f(x) d x\) = \(\int_0^a f(x) d x\) + \(\int_0^a f(2 a-x) d x\).
Hence show that:
\(\int_0^\pi \sin x d x\) = 2\(\int_0^{\frac{\pi}{2}} \sin x d x .\)
Answer:
Proof:
Since ‘a’ lies between 0’ and ‘2a’
We have.
12th Maths Question Paper 2024 Maharashtra Board Pdf 39
Now, put x = 2a – t
∴ dx = -dt
When x = a
then t = a
When x = 2a
then t = 0
12th Maths Question Paper 2024 Maharashtra Board Pdf 40
To show that:
we use the proven property by setting f(x) = sin x and
2a = π, means a = \(\frac{\pi}{2}\)
⇒ \(\int_0^\pi \sin x d x\) = \(\int_0^{\pi / 2} \sin x d x\) + \(\int_0^{\pi / 2} \sin (\pi-x) d x\)
Knowing the Trignometric identity sin(π – x) = sin x, the equation simplifies to:
\(\int_0^\pi \sin x d x\) = 2\(2 \int_0^{\pi / 2} \sin x d x\).
Hence Proved.

Maharashtra Board Class 12 Maths Previous Year Question Papers

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