A parallel plate capacitor with circular plates of radius `1m` has a capacitor of `1nF`. At `t = 0`, it is connected for charging in series with a resistor `R = 1MOmega` across a `2V` battery. Calculate the magnetic field at a point `P`, halfway between the cnetre and the periphery of the plates, after `t = 10^(-3)sec`.

A parallel plate capacitor with circular plates of radius 1m has a capacitance of 1nF. At t = 0, it is connected for chargeing in series with a resistor R=1 M Omega across a 2V battery (Figure). Calculate the magnetic field at a point P, halfway between the centre and the periphery of the plates, after t=10^(-3)s . (The charge on the capacitor at time t is q(t)=CV[1-exp((-t)/(tau))] , where the time constant tau is equal to CR).

A parallel plate capacitor with circular plates of radius 1 m has a capacitance of 1 nF. At t = 0, it is connected for charging in series with a resistor R = 1 M Omega across a 2V battery (Fig. 8.3). Calculate the magnetic field at a point P, halfway between the centre and the periphery of the plates, after t = 10^(-3) s . (The charge on the capacitor at time t is q (t) = CV [1 – exp (–t// tau) ], where the time constant tau is equal to CR.)

A parallel plate capacitor with circular plates of radius 1 m has a capacitance of 1 nF. At t = 0, it is connected for charging in series with a resistor R = 1 M Omega across a 2V battery (Fig. 8.3). Calculate the magnetic field at a point P, halfway between the centre and the periphery of the plates, after t = 10^(-3) s . (The charge on the capacitor at time t is q (t) = CV [1 – exp (–t// tau) ], where the time constant tau is equal to CR.)

A parallel plate capacitor with circular plates of radius 1 m has a capacitance of 1 nF. At t = 0, it is connected for charging in series with a resistor R = 1 M Onega across a 2V battery. Calculate the magnetic field at a point P, halfway between the centre and the periphery of the plates, after t=10^(-3)s . (The charge on the capacitor at time t is q (t) = CV [1 - exp (-t//tau) ], where the time constant tau is equal to CR.)

A parallel plate capacitor with circular plates of radius 0.8 m has a capacitance of 1 nF. At t = 0, it is connected for charging in series with a resistor R = 1 M Omega across a 4V battery. Calculate the magnetic field at a point P, halfway between the centre and the perpendicular of the plates after t=10^(-3)s . (The charge on the capacitor at time t is q (t) = CV [1 - exp (-t//tau) ], where the time constant tau is equal to CR.)

A parallel plate capacitor with circular plates of radius 1m has a c apacitance of 1n F. At t=0, it is connected for charging in series with a resistance R=1MOmega across2V battery . Calculate the magnetic field at a point P, in between the plates and half way between the centre and the periphery of the plates after 10^(-3)s.