Download GTU B.Tech 2020 Summer 4th Sem 2140603 Structural Analysis I Question Paper

Download GTU (Gujarat Technological University Ahmedabad) B.Tech/BE (Bachelor of Technology/ Bachelor of Engineering) 2020 Summer 4th Sem 2140603 Structural Analysis I Previous Question Paper

Seat No.: ________
Enrolment No.___________


GUJARAT TECHNOLOGICAL UNIVERSITY
BE - SEMESTER? IV EXAMINATION ? SUMMER 2020
Subject Code: 2140603 Date:28/10/2020
Subject Name: STRUCTURAL ANALYSIS-I
Time: 10:30 AM TO 01:00 PM Total Marks: 70
Instructions:
1. Attempt all questions.

2. Make suitable assumptions wherever necessary.

3. Figures to the right indicate full marks.

Q.1 (a) State assumptions and limitations of Euler's formula.
03

(b) A thin cylindrical shell of internal diameter d, wall thickness t
04
and length L, is subjected to internal pressure p. Derive the
expression for change in volume of the cylinder.

(c) Give equations of Static and Kinematics Indeterminacy for the
07
following structures with meaning of each term used.
(i)
Beam, (ii ) Plane truss, (iii) Plane Frame ,(iv) Grid
Q.2 (a) State and ex
plain principle of superposition.
03

(b) Explain Maxwell's theorem of reciprocal deflections.
04

(c) A hollow cast iron column 6m long is fixed at both ends and
07
thi
has an external diameter of 300mm. The column supports an
axial load of 1200kN. Find the internal diameter of the
column, adopting a factor of safety of 4. Take fc=550N/mm2
and =1/1600. E = 200 GPa


OR


(c) A cylindrical shell has 4.0 meter length, 1.2 meter diameter and
07
12 mm thickness. The shell is subjected to internal pressure of
and len
3 N/ gth
mm2 I
.c , is s
a
ubjec
lculate ted to inter
maximum nal pre
shear ssure
stre p.
ss a De
nd rive
c
ha the
nge in
expre
dime ssion fo
nsion
r cha
of she n
ll. ge
in volume of the cylinder.
Q.3 (a) Find out fixed end moment for a fixed beam carrying uniformly
03
distributed load w per meter length over entire span.

(b) State basic difference between fixed and simply supported
04
beams. State advantages of fixed beam over simply supported
beam.

(c) A fixed beam AB of span L carried a UDL of w per meter
07
length over entire span. Support B settles during application
of load. Calculate the settlement, so that there is no fixed end
mome
nt at B. Also find FEM at A.


OR

Q.3 (a) State and explain moment area theorem.
03

(b) Differentiate between real beam and conjugate beam. Justify
04
the support condition in conjugate beam.

(c) Find slope & deflection for the following structure by double
07
integration method
1

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Q.4 (a) Define resilience, proof resilience and modulus of resilience.
03

(b) A simply supported beam AB of span 6m carries a uniformly
04
distributed load of 8 kN/ m over its entire span. Determine
strain energy stored in the beam due to bending in the beam.
Take E =200GPa, I =300 cm4.

(c) A steel rod is 3 m long and 50 mm in diameter. An axial pull
07
of 40 kN is applied to the rod. Take E = 200 GN/m2.Calculate
(i) Stretch in the rod (ii) Stress in the rod (iii) Strain energy
absorbed by the rod .
In above if 40 kN load is suddenly applied ,determine
(i) Instantaneous stress induced (ii) Instantaneous elongation
produced in the rod.

OR

Q.4 (a) Distinguish clearly between direct stress and bending stress.
03

(b) Show that for no tension in the base of a short column, the
04
line of action of the load should be within the middle third.

(c) A masonry dam 6.0 m high has 1.0 m top width and 4.0m
07
base width. It retains water on its vertical face for its total
height. Determine the stresses that develop at its base and
check the section for its stability. Assume the density of the
masonry to be 24 kN /m3, safe bearing capacity of the soil as
150 kN /m2 and the coefficient of friction between masonry
and foundation bed as 0.3.
Q.5 (a) State and explain Eddy's theorem.
03

(b) A three hinged parabolic arch has a span of 20m and central
04
rise 4m. It carries a point load of 18 kN at 6 m from the left
hinge. Calculate normal thrust, shear and B.M. at a section
4m from left end hinge. Also calculate maximum positive
B.M. and it's position. Draw B.M. diagram.

(c) A three hinged parabolic arch of span L and central rise "yc"
07
carries a uniformly distributed load of "w: per unit length
over the left half of the span. Show that the max positive
moment is equal to wl2/64


OR
Q.5 (a) Differentiate between
03
(i) Static determinacy and static indeterminacy
(ii) K
inematic determinacy and Kinematic indeterminacy
(b) Define the following terms.
04
(i) Crippling load (ii) Effective length, (iii) radius of gyration,
(iv) slenderness ratio.
(c) Find slope at A and deflection at E for a beam shown in figure
07
either by Macaulay's method or by conjugate beam method .
2

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