The diagram shows stress v/s strain curve for the materials A and B. From the curves we infer that
(1) A is brittle but B is ductile
(2) A is ductile and B is brittle
(3) Both A and B are ductile
(4) Both A and B are brittle
If the potential energy of a spring is V on stretching it by 2 cm, then its potential energy when it is stretched by 10 cm will be
(1) V/25
(2) 5V
(3) V/5
(4) 25V
Two wires of same diameter of the same material having the length l and 2l. If the force F is applied on each, the ratio of the work done in the two wires will be
(1) 1 : 2
(2) 1 : 4
(3) 2 : 1
(4) 1 : 1
A \(5\) m long wire is fixed to the ceiling. A weight of \(10\) kg is hung at the lower end and is \(1\) m above the floor. The wire was elongated by \(1\) mm. The energy stored in the wire due to stretching is:
1. zero
2. \(0.05\) J
3. \(100\) J
4. \(500\) J
If the force constant of a wire is K, the work done in increasing the length of the wire by l is:
1.
2.
3.
4.
When strain is produced in a body within elastic limit, its internal energy:
1. Remains constant
2. Decreases
3. Increases
4. None of the above
A wire is suspended by one end. At the other end a weight equivalent to 20 N force is applied. If the increase in length is 1.0 mm, the increase in energy of the wire will be
(1) 0.01 J
(2) 0.02 J
(3) 0.04 J (4) 1.00 J
The ratio of Young's modulus of the material of two wires is 2 : 3. If the same stress is applied on both, then the ratio of elastic energy per unit volume will be-
(1) 3 : 2
(2) 2 : 3
(3) 3 : 4
(4) 4 : 3
The stress versus strain graphs for wires of two materials A and B are as shown in the figure. If and are the Young ‘s modulii of the materials, then
(1)
(2)
(3)
(4)
If a spring extends by x on loading, then the energy stored by the spring is (if T is tension in the spring and k is spring constant)
(1)
(2)
(3)
(4)