A police party is moving in a jeep at a constant speed \(v.\) They saw a thief at a distance \(x\) on a motorcycle which is at rest. The moment the police saw the thief, the thief started at constant acceleration which of the following relations is true if the police is able to catch the thief?
1. \(v^2<ax\)
2. \(v^2<2ax\)
3. \(v^2\geq 2ax\)
4. \(v^2=ax\)
1. | air flows from the bigger bubble to the smaller bubble till sizes become equal. |
2. | air flows from the bigger bubble to the smaller bubble till sizes are interchanged. |
3. | air flows from smaller bubbles to bigger ones. |
4. | there is no flow of air. |
The thermo emf of a hypothetical thermocouple varies with the temperature \(\theta\) of the hot junction as \(E=a\theta+b\theta^2\) in volts, where the ratio is \(\frac ab\) is \(700~^\circ \mathrm{C}.\) If the cold junction is kept at \(0~^\circ \mathrm{C},\) then the neutral temperature is:
1. | \(700~^\circ \mathrm{C}\) |
2. | \(1400~^\circ \mathrm{C}\) |
3. | \(-350~^\circ \mathrm{C}\) |
4. | No neutral temperature is possible for this thermocouple. |
A launching vehicle carrying an artificial satellite of mass \(m\) is set for launch on the surface of the earth of mass \(M\) and radius \(R.\) If the satellite is intended to move in a circular orbit of radius \(7R,\) the minimum energy required to be spent by the launching vehicle on the satellite is:
(Gravitational constant= \(G\))
1. \(\frac{GMm}{R}\)
2. \(-\frac{13GMm}{14R}\)
3. \(\frac{GMm}{7R}\)
4. \(-\frac{GMm}{14R}\)
If the ratio of lengths, radii and Young's modulus of steel and brass wires shown in the figure are \(a,\) \(b\) and \(c\) respectively, the ratio between the increase in lengths of brass and steel wires would be:
1. \( \frac{{b}^{2}a}{2c}\)
2. \( \frac{bc}{2{a}^{3}}\)
3. \( \frac{{ba}^{2}}{2c}\)
4. \( \frac{a}{2{b}^{2}c}\)
A soap bubble of radius \(r\) is blown up to form a bubble of radius \(2r\) under isothermal conditions. If \(T\) is the surface tension of the soap solution, the energy spent in the blowing is:
1. \(3\pi Tr^2\)
2. \(6\pi Tr^2\)
3. \(12\pi Tr^2\)
4. \(24\pi Tr^2\)
A current of \(1.6\) A is passed through a solution of CuSO4. How many Cu++ ions are liberated in one minute? (Electronic charge= \(1.6\times10^{-19}\) C)
1. 3 × 1020
2. 3 × 1010
3. 6 × 1020
4. 6 × 1010
1. | a magnet |
2. | an unmagnetised iron bar |
3. | a moving charge |
4. | stationary charge |