Engineering Mathematics I Assignment PDF 2024-2025 - Babu Banarasi Das

Summary

This is a mathematics assignment for the first year of a Bachelor of Technology program at Babu Banarasi Das Northern India Institute of Technology. The assignment covers topics including polynomial expansions, error estimation, functional independence, and optimization.

Full Transcript

Bachelor of Technology – First Year(All Branches)
BABU BANARASI DAS
NORTHERN INDIA INSTITUTE OF TECHNOLOGY
Affiliated to Dr. A.P.J. Abdul Kalam Technical University (AKTU Code : 056)
AKTU Code : 056
Approved by All India Council for Technical Education (AICTE)
Sector II, Dr Akhilesh Das Nagar, Faizabad Road, Lucknow (UP) – India, 226028
Website : www.bbdniit.ac.in
BTECH FIRST YEAR / FIRST SEMESTER / 2024-25
ASSIGNMENT NO. : A3
1. Name of Subject: Engineering Mathematics I
2. AKTU Subject Code: BAS 103
3. NBA Subject Code:C132
4. Unit Covered: 3
5. Date of Issue : 22/11/2024 Last Date of Submission:30/11/2024 Marks: 25
Q# Question Description CO BTL MM

Expand f ( x, y)  e x log( 1  y) in powers of x and y up to term
1 3 K3 5
of third degree.

In estimating the cost of a pile of bricks measured as
2m 15m 1.2m , the tape is stretched 1% beyond the standard
2 3 K3 5
length. If the count is 450 bricks to 1 cubic meter and bricks
cost is 530 rs per 1000, find the approximate error in the cost.

x y
Show that u  , and v  tan 1 x  tan 1 y are not functionally
3 1  xy 3 5
K3
independent. Find the relation between them.

If u, v, w are the roots of the cubic equation
4 (u, v, w) 3 K3 5
(  x)3  (  y)3  (  z )3  0 in  , then find.
 ( x, y , z )
(a) Find the extreme value of the function u  x 3  y 2  3axy.
5 (b) Divide 24 in to three parts such that the continued product of the first, 3 K3 5
square of the second and cube of third may be maximum.

Name of Faculty:

BBDNIIT 2024-25(Odd Semester) Page1