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Seat No.: Enrolment No.
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GUJARAT TECHNOLOGICAL UNIVERSITY
Pharm D — 1st Year EXAMINATION - SUMMER - 2018
Subject Code: 818807 Date: 01/06/2018
Subject Name: Remedial mathematics
Time: 10:30am TO 01:30pm Total Marks: 70
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Instructions:
- Attempt any five questions.
- Make suitable assumptions wherever necessary.
- Figures to the right indicate full marks.
Q.1
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(a) Given A(2,4), B(6,8), C(a+4,2a+b)and CA | BC, find a. 06
(b) Expand by SARRUSRULE 04
(c) If cos? +sin? = v2 cos?, show that cos? — sin? = v2sin? 04
Q.2
(a) Solve the following simultaneous equations using cramer’s rule. 06
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x+y+z =4, 2x-3y+4z=33, 3x-2y-2z=2.
(b) Prove that = 2sinx 04
(c) Show that points (1, 1), (2,3) and (3,5) are collinear. 04
Q.3
(a) Using theorems prove that = xyz(x-y)(y-z)(z-x) 06
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(b) Evaluate lim x?8 04
(c) Prove that sin10° sin 30° sin50° sin70° = 1/16. 04
Q.4
(a) Solve the differential equation: 06
xy' = y+2 if y(1) =1.
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(b) Solve (xy2 +x) dx.+ (yx*+y) dy = 0. 04
(c) Solve the following differential equation 04
(1+x2) dy = x2ydx
Q.5
(a) If y= find 06
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(b) Solve: 2xy -z =x2+3y2 04
(c) Evaluate lim x?0(1 + 2x)1/x 04
Q.6
(a) Solve the following differential equation: 06
=
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(b) Evaluate: ?sin6x cos4x dx 04
(c) Solve : L-1( ) 04
Q.7
(a) Evaluate: ? dx 06
(b) Find the Laplace transform of cos2t. 04
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(c) Evaluate: ?0p/2sin6 x dx. 04
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