Loyola College B.Sc. Physics April 2007 Allied Mathematics For Physics Question Paper PDF Download

LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc.

CV 08

DEGREE EXAMINATION –PHYSICS

THIRD SEMESTER – APRIL 2007

MT 3100ALLIED MATHEMATICS FOR PHYSICS

 

 

Date & Time: 28/04/2007 / 9:00 – 12:00        Dept. No.                                                     Max. : 100 Marks

 

 

 

Section A

Answer ALL the questions (10 x 2 =20)

1) Evaluate.

2) Find .

3) Find .

4) If cos5q = Acosq + Bcos3q+ Ccos5q , prove that

sin5q = A sinq -Bsin3q + Csin5q.

5) If  , prove that .

6) If y = e 2x, prove that .

7) Show that in the curve r = e q cot a , the polar subtangent is rtana.

8) Derive the expansion of  .

9) Find the coefficient of  in the series

10) Explain the concept of mutually exclusive events with an example.

 

Section B

Answer any FIVE questions (5 x 8 = 40)

11) Determine a, b, c so that .

12) Find  L[t2 e -t cost].

13) Using Laplace transform solve , given.

14) Prove that  .

15) If , prove that .

16)  Verify Cayley Hamilton theorem for the matrix .

17)  Sum the binomial series  .

 

18)  Assuming that half the population own a two wheeler in a city so that the chance

of an individual  having a two  wheeler is ½  and assuming that 100 investigators

can  take sample of 10 individuals  to see  whether  they own a two wheeler, how

many  investigators  would you expect  to report  that  three  people or  less  were

having two wheelers.?

 

Section  C

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

19) Solve , given x(0) = 0: y(0)=2 using Laplace

transform.

20) (a) Find the real and imaginary parts of sin (x+iy) and tan(u + iv).

If , prove that .

(b) If  , prove that .                                  (10+10)

21) a) Find the angle at which the radius vector cuts the curve .

  1. b) A person is  known to hit  target in 3 out  of 4 shots, whereas another person is

known to hit the target 2 out of 3 shots. Find the probability of the targets being

hit at all shots when they both try.

  1. c) A bag contains 5 white  and  3 black balls. Two balls are drawn at random one

after the other without  replacement. Find  the probability that both balls drawn

are black.                                                                                                (10+5+5)

22) a) Find the eigen values and eigen vectors of the matrix

  1. b) Find the first term with a negative coefficient in the expansion of

(15+5)

 

Go To Main Page

 

Latest Govt Job & Exam Updates:

View Full List ...

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