determine the

a)charge on the capacitor
b)voltage across the capacitor
c)current through the resistor after t=rc when a capacitor is getting charged interms of their peak values

Incomplete.

To determine the charge on the capacitor, voltage across the capacitor, and current through the resistor after t=rc when a capacitor is getting charged in terms of their peak values, we'll need to consider the charging process of a RC circuit.

An RC circuit consists of a resistor (R) and a capacitor (C) connected in series to a voltage source (V). When the circuit is connected, the capacitor starts charging, and the voltage across the capacitor starts increasing gradually.

a) Charge on the Capacitor:
The charge on the capacitor at any time t is given by the equation: Q = Q_max * (1 - e^(-t/RC)), where Q_max is the maximum charge the capacitor can hold when fully charged, t is the time, R is the resistance, and C is the capacitance.

b) Voltage across the Capacitor:
The voltage across the capacitor at any time t is given by the equation: Vc = V * (1 - e^(-t/RC)), where V is the applied voltage from the source.

c) Current through the Resistor after t=rc:
After t=rc, the capacitor reaches approximately 63.2% of its final charged value. At this point, the current through the resistor can be calculated using Ohm's Law (V = IR), where V is the voltage across the resistor, I is the current, and R is the resistance. Since V is the same as the voltage across the capacitor at t=rc, we can use the equation from part (b) to find the voltage, and then apply Ohm's Law to find the current.

Therefore, the current through the resistor after t=rc when a capacitor is getting charged, in terms of their peak values, is given by: I = (V_max / R) * e^(-t/RC), where V_max is the maximum voltage across the capacitor.

By substituting the appropriate values for R, C, V_max, and t into the above equations, you can determine the desired values for a), b), and c).