LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034
B.Sc. DEGREE EXAMINATION – MATHEMATICS
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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)
- Write the Leibnitz’s formula for the nth derivative of a product uv.
- Prove that the subtangent to the curve y=ax is of constant length.
- Prove that =
- Find L[e-2tsin2t]
- If y = log ( 1+x ).then find D2y
- Expand tan 7q in terms of tanq
- Prove that the matrix is orthogonal
- If tan = tan h then show that cosx coshx = 1
- 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
- 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 =
- Sum to infinity the series:-
- Verify Cayley Hamilton theorem for the matrix
A =
- If sin () = tan ( x + iy) , Show that
- If sin (A + iB) = x + iy ,
Prove that (i) (ii)
- Find L-1
- Ten coins are tossed simultaneously. Find the probability of getting at least seven heads.
SECTION C
Answer Any TWO Questions. (2 x 20 = 40)
- (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)
- a)Solve the equation , given that y =when t = 0.
b)Find L-1 (15 + 5)
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