Loyola College B.Sc. Physics April 2003 Mathematics For Physics Question Paper PDF Download

LOYOLA COLLEGE (Autonomous), chennai – 600 034

B.Sc.  degree examination – physics

third semester -april 2003

 Mt  3100/ MAT 100 mathematics for physics

28.04.2003                                                                                     Max.: 100 Marks

9.00 – 12.00

 

PART A                                       (10 ´ 2 = 20 Marks)

  1. Define Laplace transform of f(t) and prove that L(eat) = .
  2. Find .
  3. Prove that the mean of the Poisson distribution Pr =, r = 0, 1, 2, 3 ….. is equal to m.
  4. Mention any two significance of the normal distribution.
  5. Find the .
  6. Find L (1+ t)2 .
  7. Find L-1.
  8. Write down the real part of sin .
  9. Prove that in the R.H. xy = c2, the subnormal varies as the cube of the ordinate.
  10. If y = log (ax +b), find y

 

PART B                                          (5 ´ 8 = 40 Marks)

Answer any FIVE questions.  Each question carries EIGHT marks

  1. (a) Find L-1

           

  • Find L .
  1. Find L  .
  2. Define orthoganal matrix and prove that the matrix is orthoganal.
  3. Verify cayley-Hamilton theorem and hence find the inverse of
  4. (i)  Prove that
  • Find the sum to infinity of series

 

 

 

 

 

  1. (i) Find q approximately to the nearest minute if cos q =

(ii)   Determine a, b, c such that     .

 

  1. If cos (x + iy) = cos q + i sinq,  Show that cos 2x + cosh 2y =2.

 

  1. What is the rank of .

 

PART C                                      (2 ´ 20 = 40 Marks)

Answer any TWO questions. Each question carries twenty marks.

 

  1. (a) If y = .

 

  • Find the angle of intersection of the cardioids r = a(1+cosq) and r = b(1-cosq).
  1. (a) Certain mass -produced articles of which 0.5 percent are defective, are packed

in  cartons each containing 130 article.  What Proportion of cartons are free

from defective articles, and what proportion contain 2 or more defectives

(given e-2.2 = 0.6065)

 

  • Of a large group of men 5 percent are under 60 inches in height and 40 percent are between 60 and 65 inches. Assuming a normal distribution find the mean height and standard deviation.

 

  1. (a) Find the sum to infinity of the series

 

  • From a solid sphere, matter is scooped out so as to form a conical cup, with vertex of the cup on the surface of the sphere, Find when the volume of the cup is maximum.

 

  1. a) Prove that sin5q =
  2. b) Prove that sin4q cos2q =

 

 

 

Go To Main page

Loyola College B.Sc. Physics Nov 2008 Mathematics For Physics Question Paper PDF Download

LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – PHYSICS

 

AB 03

 

THIRD SEMESTER – November 2008

MT 3102/MT 3100 – MATHEMATICS FOR PHYSICS

 

 

 

Date : 11-11-08                       Dept. No.                                          Max. : 100 Marks

Time : 9:00 – 12:00

Section A

Answer ALL questions:                                                                                                  (10 x 2 = 20)

  1. If   then show that .
  2. Prove that the subtangent to the curve  is of constant length.

 

  1. Show that

 

  1. Find the rank of the matrix .
  2. Find .
  1. Find .
  2. Write the expansion of tan nq in terms of tanq.
  3. Prove that cosh2xsinh2x = 1.
  4. A bag contains 3 red, 6 white, 7 blue balls. What is probability that two balls drawn are white and blue balls?
  5. A Poisson variate X is such that 2 P(X = 1) = 2P(X =2). Find the mean.

 

Section B

Answer any FIVE questions:                                                                                       (5 x 8 = 40)

  1. Find the derivative of .
  2. Find the maxima and minima of .
  3. Prove that .
  4. Find .
  5. Ifprove that .
  6. Expand in terms of cosq.
  7. Find the mean and standard deviation for the following data:

 

Years under 10 20 30 40 50 60
No. of people 15 32 51 78 97 109
  1. X is normally distributed with mean 12 and standard deviation 4. Find the probability of the following:

(i)            X ³ 20             (ii)  X £ 20             (iii) 0 £ X £ 12.

given that z2.0 = 0. 4772, z3.0 = 0. 4987, z4.0 = 0. 4999.

 

Section C

Answer any TWO questions:                                                                             (2 x 20 = 40)

 

  1. (a) Find the sum of the series to infinity:

(b) If   then prove that  and hence prove .                                          (10 +10) 

 

  1. (a) Find the characteristic roots and characteristic vectors of the matrix

.

(b)  Verify Cayley Hamilton Theorem for matrix .

(12+8)

  1. (a) Find the Laplace transform of

 

(b) Using Laplace transform, solve the equation y¢¢ + 2y¢ – 3y = sin t, given that y = y¢ = 0 when t = 0.

(8+ 12)

  1. (a) Expand sin3qcos5q in a series of sines of multiplies of q.

 

(b) In the long run 3 vessels out of every 100 are sunk. If 10 vessels are out, what is

the probability that (i) exactly 6 will arrive safely.  (ii) at least 6 will arrive safely.

(10 +10)

 

 

 

Go To Main page

 

 

Loyola College B.Sc. Physics April 2009 Mathematics For Physics Question Paper PDF Download

      LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – PHYSICS

ZA 06

THIRD SEMESTER – April 2009

MT 3102 / 3100 – MATHEMATICS FOR PHYSICS

 

 

 

Date & Time: 17/04/2009 / 1:00 – 4:00      Dept. No.                                                       Max. : 100 Marks

 

 

SECTION A

Answer ALL questions:                                                                   (10 x 2 = 20)

  1. Find the n th derivative of
  2. Find the polar subtangent and subnormal for the curve .
  3. Prove that
  4. Find the rank of the matrix
  5. Find .
  6. Find .
  7. Expand .
  8. Prove that
  9. A letter of English alphabet is chosen at random. Find the probability that the letter so chosen follows m and is a vowel.
  10. With the usual notation state Poisson distribution.

 

SECTION B

Answer any FIVE questions:                                                           (5 x 8 = 40)

  1. Find the nth derivative of .
  2. Find the angle of intersection of the curves and .
  3. Find the sum to infinity the series
  4. Find the inverse Laplace transform of
  1. If prove that .
  1. Expand in terms of cosq.
  1. 25 books are placed at random in a shelf. Find the probability that a pair of books shall be always together.
  2. If two dice are thrown, what is the probability that the sum is greater than 8.

 

SECTION C

Answer any TWO questions:                                                                       (2 x 20 = 40)

 

  1. (a)If prove that

(b) Find the maxima and minima of .                   (10+10)

  1. (a) Find the characteristic roots and the associated characteristic vectors of the matrix

 

(b) Verify Cayley Hamilton Theorem for matrix  .

(12+8)

  • (a) Express in a series of cosines of multiples of θ.

(b) Find .

(c) Separate into real and imaginary parts of .                                  (5+5+10)

22  (a) Solve , given  and .

(b) A coin is tossed six times. What is the probability of obtaining four or more heads?

 

(12+8)

 

 

 

 Go To Main page

Loyola College B.Sc. Physics April 2012 Mathematics For Physics Question Paper PDF Download

LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – PHYSICS

THIRD SEMESTER – APRIL 2012

MT 3102/3100 – MATHEMATICS FOR PHYSICS

 

 

Date : 28-04-2012              Dept. No.                                        Max. : 100 Marks

Time : 9:00 – 12:00

 

Section A

Answer ALL questions:                                                                                 (10 ´ 2 = 20)

  1. Find the nth derivative of e4x.
  2. Show that in the curve rq = a, the polar sub tangent is constant.
  3. Expand in ascending powers of x, ‘a’ being positive.
  4. Define a symmetric matrix and give an example.
  1. Find the Laplace transform of t2 + 2t + 3.
  1. Find .
  2. Prove that .
  3. Write down the expansion of and  in a series of ascending powers of .
  4. Two dice are thrown. What is the probability that the sum of the numbers is greater than 8?
  5. Write a short note on binomial distribution.

 

Section B

Answer any FIVE questions:                                                                           (5 ´ 8 = 40)

  1. Find the nth differential coefficient of sinx sin2x sin3x.

 

  1. Find the angle of intersection of curves rn = ancosnq and rn = an sinnq.

 

  1. Show that .
  2. Show that the matrix is orthogonal.

 

  1. Find the Laplace transform of

 

  1. Separate into real and imaginary parts of .
  2. Prove that .

 

  1. Calculate the mean and standard deviation for the following frequency distribution:
Class Interval 0 – 8 8 – 16 16 – 24 24 – 32 32 – 40 40 – 48
Frequency 8 7 16 24 15 7

 

Section C

 

Answer any TWO questions:                                                                        (2 ´ 20 = 40)

 

  1. a) If y = acos(logx) + bsin(logx), prove that x2yn + 2 + (2n + 1)xyn + 1 + (n2 + 1)yn = 0.
  2. b) Find the sum to infinity of the series .

(12 + 8)

20.a) Find the characteristic roots of the matrix .

  1. b) Verify Cayley Hamilton Theorem for matrix and also find .                                                                                                              (6 + 14)
  2. a) Find .
  3. b) Solve the equation given that when t = 0.

(5 + 15)

  1. a) Ifprove that .
  2. b) Express in a series of sines of multiples of θ.
  3. c) A car hire firm has two cars, which it hires out day by day. The number of demands for a car on each day is distributed as a Poisson distribution with mean 1.5. Calculate the proportion of days on which (i) neither car is used, and (ii) the proportion of days on which some demand is refused.                                                                                                                                            (8+5+7)

 

 

Go To Main Page

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 


 

Loyola College B.Sc. Physics Nov 2012 Mathematics For Physics Question Paper PDF Download

LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – PHYSICS

FIRST SEMESTER – NOVEMBER 2012

MT 1100 – MATHEMATICS FOR PHYSICS

 

 

Date : 03/11/2012             Dept. No.                                        Max. : 100 Marks

Time : 1:00 – 4:00

 

 

SECTION A

ANSWER ALL THE QUESTIONS:                                                                                         (10×2 =20)

 

  • Find the nth derivative of.
  • Write down the formula for subtangent and subnormal.
  • Prove that .
  • Find the rank of the matrix.
  • Show that .
  • State the formula for Laplace transformation of a periodic function.
  • Write down the expansion for.
  • If Show that
  • What is the chance that a leap year selected at random will contain 53 Sundays?
  • Define Binomial distribution.

 

SECTION B

ANSWER ANY FIVE QUESTONS:                                                                               (5×8 =40)

 

  • Find the angle of intersection of cardioidsand.
  • Find the minimum and maximum value of the function.
  • Find the sum to infinity series.
  • Show that the system of equations

 

are consistent and solve them.

  • Find the L(f(t)) if
  • Find a)   b) .
  • Prove that cos8θ = 1- 32sin2 θ + 160sin4 θ-256sin6 θ+128 sin8 θ.
  • Find the moment generating function for the Poisson distribution and hence find its

mean and variance.

 

SECTION C

ANSWER ANY TWO QUESTIONS:                                                                                  (2×20 = 40)

  • a) If then Prove that. b) Find the nth derivative of. (10+10)
  • If then
  1. a) Find the characteristic value and characteristic vector of the matrix.
  2. b) Verify Cayley Hamilton Theorem and find A-1. (10+10)
  • a) Express cos5θ sin3θ in terms of sines of multiples of θ.
  1. b) Separate into real and imaginary parts of tan-1(α+iβ). (10+10)
  • a) Solve with using Laplace transform.
  1. b) An urn contains 6 white, 4 red and 9 black balls. If 3 balls are drawn at random, find the probability that: (i) two of the ball drawn is white; (ii) one is of each colour,

(iii) none is red.

(14+6)

 

 

Go To Main Page

Loyola College B.Sc. Physics Nov 2012 Mathematics For Physics Question Paper PDF Download

LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – PHYSICS

THIRD SEMESTER – NOVEMBER 2012

MT 3102/3100 – MATHEMATICS FOR PHYSICS

 

 

Date : 07/11/2012             Dept. No.                                        Max. : 100 Marks

Time : 9:00 – 12:00

 

SECTION A

ANSWER ALL QUESTIONS.                                                                               (10 x 2 = 20)

  1. Find the nth derivative of .
  2. Find the slope of the curve at .
  3. Write the expansion for .
  4. Find the rank of the matrix .
  5. Find the Laplace transform of .
  6. Find .
  7. Write down the expansion of in powers of .
  8. Show that .
  9. Two dice are thrown. What is the probability that the sum of the numbers is greater than 8?
  10. Define Normal distribution.

 

SECTION B

ANSWER ANY FIVE QUESTIONS.                                                                 (5 x 8 = 40)

  1. Find the nth differential coefficient of .
  2. Find the maximum value of for positive values of x.
  3. Find the characteristic roots of the matrix .
  4. Find the Laplace transform of .
  5. Express in a series of sines of multiple of .
  6. Four cards are drawn at random from a pack of 52 cards. Find the probability that

(i) they are a king, a queen, a jack and an ace.

(ii) two are kings and two are queens.

(iii) two are black and two are red.

  1. A car hire firm has two cars, which it hires out day by day. The number of demands for a car on each day is distributed as a Poisson distribution with mean 1.5. Calculate the proportion of days on which (i) neither car is used, (ii) the proportion of days on which some demand is refused.
  2. X is a normal variable with mean 30 and standard deviation 5. Find the probabilities that

(i) 26  X  40, (ii) X  45.

 

SECTION C

ANSWER ANY TWO QUESTIONS.                                                                 (2 x 20 = 40)

  1. (a) If , then prove that .

(b) Find the length of subtangent and subnormal at any point t on the curve  and .                                                        (12 + 8)

  1. (a) Verify Cayley-Hamilton theorem for the matrix and also find .

(b) Find the sum to infinity of the series . (12 + 8)

  1. (a) Express in terms of .

(b) Find the mean and standard deviation for the following data:

x 10 20 30 40 50 60
f 15 32 51 78 97 109

(10 + 10)

  1. (a) Solve the equation given that when .

(b) Ten coins are thrown simultaneously. Find the probability of getting at least seven

heads?                                                                                                                   (12 + 8)

 

 

 

Go To Main Page

Loyola College B.Sc. Mathematics April 2008 Mathematics For Physics Question Paper PDF Download

LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – MATHEMATICS

XZ 3

 

THIRD SEMESTER – APRIL 2008

MT 3102 / 3100 – MATHEMATICS FOR PHYSICS

 

 

Date : 07/05/2008                Dept. No.                                        Max. : 100 Marks

Time : 1:00 – 4:00

SECTION A

Answer ALL questions.                                                                                             (10 x 2 = 20)

 

  1. Write the Leibnitz’s formula for the nth derivative of a product uv.
  2. Prove that the subtangent to the curve y=ax is of constant length.
  3. Prove that =
  4. Find L[e-2tsin2t]
  5. If y = log ( 1+x ).then find D2y
  6. Expand tan 7q in terms of tanq
  7. Prove that the matrix is orthogonal
  8. If tan = tan h then show that cosx coshx = 1
  9. Find the A.M. of the following frequency distribution.

x :   1    2     3      4       5       6       7

f  :  5     9    12     17    14     10      6

  1. Write the general formula in Poisson’s distribution.

 

SECTION B

Answer any FIVE questions.                                                                         (5 x 8 = 40)

 

11.If y=sin-1x, prove that  ( 1-x2 )y2 –xy1 =o and (1-x2)yn+2-(2n+1)xyn+1-n2yn=o

12.Find the length of the subtangent, subnormal, tangent and normal at the point (a,a) on the

cissoid  y2 =

  1. Sum to infinity the series:-

 

  1. Verify Cayley Hamilton theorem for the matrix

A =

  1. If sin () = tan ( x + iy) , Show that
  2. If sin (A + iB) = x + iy ,

Prove that  (i)    (ii)

 

  1. Find L-1
  2. Ten coins are tossed simultaneously. Find the probability of getting at least seven heads.

 

SECTION C

Answer Any TWO Questions.                                                                                   (2 x 20 = 40)

  1. (a) Prove that 1 +

(b) Find the mean and standard deviation for the following table, giving the age

distribution of 542 members.

Age in years

 

20-30 30-40 40-50 50-60 60-70 70-80 80-90
No. of members 3 61 132 153 140 51 2

 

20.(a) Prove that  64cos6q – 80 cos4q + 24 cos2q – 1

(b) Expand sin3q cos4q in terms of sines of multiples of angles.                            (10 + 10)

21.a)Find the maxima and minima of x5-5x4+5x3+10

b)Find the length of the subtangent  and subnormal  at the point `t’ of the curve

x = a(cost + t sint),

y =  a(sint-tcost)                                                                                                 (10 + 10)

  1. a)Solve the equation , given that y =when t = 0.

       

            b)Find L-1                                                                                  (15 + 5)

 

Go To Main Page

 

© Copyright Entrance India - Engineering and Medical Entrance Exams in India | Website Maintained by Firewall Firm - IT Monteur