applied mathematics
FEDERAL PUBLIC SERVICE COMMISSION
COMPETITIVE EXAMINATION FOR RECRUITMENT TO POSTS IN BS-17 UNDER THE FEDERAL GOVERNMENT, 2013
TIME ALLOWED: THREE HOURS MAXIMUM MARKS: 100
NOTE: (i) Candidate must write Q. No. in the Answer Book in accordance with Q. No. in the Q. Paper.
(ii) Attempt FIVE questions in all by selecting TWO questions from SECTION-A and ONE
question from SECTION-B and TWO questions from SECTION-C ALL questions carry EQUAL marks.
(iii) Extra attempt of any question or any part of the attempted question will not be considered. (iv) Use of Calculator is allowed.
Q.No.1. Solve the following equations:
d3ydy
Sec2x 3 dxdx
2dyx
x3Cosy 0 (b)
ydx
Q.No.2.
(a)
(b)
Q.No.3.
(a) (b)
Q.No.4.
(a) (b)
Find the power series solution of the differential equation (1 x2)y// 2xy/ 2y 0, about the point x= 0. Solve Z(x+y)
(10)(10)
(10)(10)(5)
Z Z
Z(x y) (x2 y2).
y x
Classify the following equations:
2
2Z1 Z2 Zx 0 (i) 22
x x x y(ii)
2
2Z 2Z2 Zx 2xy y 4x2 22
x y y x2
u 2u
, 1 x 1,t 0 Solve:
t x2
u u( 1,t) (1,t)for t
> 0 u(-1, t) = u(1, t);
x x
u(
x, o) = x+1, -1< x <1.
(15)
Highlight the difference between a vector and a tensor. What happens if we
permute the subscripts of a tensor? Transform g
ab
(5)(15)
1 0 0
2 into Cartesian coordinates. r
搜索“diyifanwen.net”或“第一范文网”即可找到本站免费阅读全部范文。收藏本站方便下次阅读,第一范文网,提供最新工程科技css-applied-mathematics2-2013全文阅读和word下载服务。
相关推荐:
笑得太过