A total charge \(Q\) is broken in two parts \(Q_1\) and \(Q_2\) and they are placed at a distance \(R\) from each other. The maximum force of repulsion between them will occur, when:
1. | \(Q_2=\frac{Q}{R}, Q_1=Q-\frac{Q}{R}\) |
2. | \(Q_2=\frac{Q}{4}, Q_1=Q-\frac{2 Q}{3}\) |
3. | \(Q_2=\frac{Q}{4}, Q_1=\frac{3 Q}{4}\) |
4. | \(Q_1=\frac{Q}{2}, Q_2=\frac{Q}{2}\) |
Two charges \(+2\) C and \(+6\) C are repelling each other with a force of \(12\) N. If each charge is given \(-2\) C of charge, then the value of the force will be:
1. | \(4\) N (attractive) | 2. | \(4\) N (repulsive) |
3. | \(8\) N (repulsive) | 4. | zero |
1. | \(4\) cm from \(2~\mu\text{C}\). |
2. | \(2\) cm from \(2~\mu\text{C}\). |
3. | \(2\) cm from \(8~\mu\text{C}\). |
4. | \(3\) cm from \(8~\mu\text{C}\). |
Two positive ions, each carrying a charge \(q\), are separated by a distance \(d\). If \(F\) is the force of repulsion between the ions, the number of electrons missing from each ion will be:
(\(e\) is the charge on an electron)
1. | \(\frac{4 \pi \varepsilon_{0} F d^{2}}{e^{2}}\) | 2. | \(\sqrt{\frac{4 \pi \varepsilon_{0} F e^{2}}{d^{2}}}\) |
3. | \(\sqrt{\frac{4 \pi \varepsilon_{0} F d^{2}}{e^{2}}}\) | 4. | \(\frac{4 \pi \varepsilon_{0} F d^{2}}{q^{2}}\) |
The acceleration of an electron due to the mutual attraction between the electron and a proton when they are \(1.6~\mathring{A}\) apart is:
\(\left(\dfrac{1}{4 \pi \varepsilon_0}=9 \times 10^9~ \text{Nm}^2 \text{C}^{-2}\right)\)
1. | \( 10^{24} ~\text{m/s}^2\) | 2 | \( 10^{23} ~\text{m/s}^2\) |
3. | \( 10^{22}~\text{m/s}^2\) | 4. | \( 10^{25} ~\text{m/s}^2\) |
1. | \(\dfrac{4F}{3}\) | 2. | \(F\) |
3. | \(\dfrac{9F}{16}\) | 4. | \(\dfrac{16F}{9}\) |
1. | Newton metre2 / Coulomb2 |
2. | Coulomb2 /Newton metre2 |
3. | Coulomb2/ (Newton metre)2 |
4. | Coulomb/Newton metre |
Two small spheres each having the charge \(+Q\) are suspended by insulating threads of length \(L\) from a hook. If this arrangement is taken in space where there is no gravitational effect, then the angle between the two suspensions and the tension in each will be:
1.
2.
3.
4.
Four charges are arranged at the corners of a square \(ABCD\) as shown in the figure. The force on a positive charge kept at the center of the square is:
1. | zero |
2. | along diagonal \(AC\) |
3. | along diagonal \(BD\) |
4. | perpendicular to the side \(AB\) |