LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034
B.Sc. DEGREE EXAMINATION – PHYSICS
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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)
- If then show that .
- Prove that the subtangent to the curve is of constant length.
- Show that
- Find the rank of the matrix .
- Find .
- Find .
- Write the expansion of tan nq in terms of tanq.
- Prove that cosh2x – sinh2x = 1.
- A bag contains 3 red, 6 white, 7 blue balls. What is probability that two balls drawn are white and blue balls?
- 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)
- Find the derivative of .
- Find the maxima and minima of .
- Prove that .
- Find .
- Ifprove that .
- Expand in terms of cosq.
- 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 |
- 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)
- (a) Find the sum of the series to infinity:
(b) If then prove that and hence prove . (10 +10)
- (a) Find the characteristic roots and characteristic vectors of the matrix
.
(b) Verify Cayley Hamilton Theorem for matrix .
(12+8)
- (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)
- (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)
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