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October 2011
[KZ 806] Sub. Code: 3806
DOCTOR OF PHARMACY (PHARM. D) DEGREE EXAMINATION
FIRST YEAR
PAPER VI - REMEDIAL MATHEMATICS
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O.P. Code : 383806
Time : 3 hours Maximum : 100 marks
(180 Min)
Answer ALL questions in the same order.
I. Elaborate on : Pages Time Marks
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(Max.) (Max.) (Max.)
- Find the inverse of |1 -1 2 300 4 17 40 20 1 2 5
- Solve the differential equation 17 40 20 (D²— 4D +4) y= 8 ( x²+ e2x+sin2x)
II. Write notes on:
- If A=
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|2 2 4
-1 3 4
1 2 0|
Show that A= A. 4 10 6 - Define i) Square matrix, (ii) Diagonal matrix, (iii) Transpose matrix. 4 10 6
- Prove that tan-13A — tan-19A — tan-14A = tan-13A tan-19A tan-14A 4 10 6
- Find the distance between the points, (acosa, asin a) and ( acosß, asinß) 4 10 6
- Differentiate : (x+3)(x-2) / (x-1) (x-3) 4 10 6
- Integrate: ? logx dx 4 10 6
- Solve: (D²+D+1) y=0 4 10 6
- Find laplace transform 4 10 6 F(t) = et+ t2 — 2sin3t +3cos2t
- Evaluate : ?12 (x2- 3x+1)dx 4 10 6
- Solve (D²+6D+9)y=0 4 10 6
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This download link is referred from the post: Pharm D Last 12 Years 2010-2022 Question Papers (1st Year, 2nd Year, 3rd Year, 4th Year and 5th Year)