Answer:
The value of current through the rod becomes half
[tex]i' = \frac{i}{2}[/tex]
Explanation:
As per Ohm's law we know that the current through a resistor is given as
[tex]i = \frac{V}{R}[/tex]
here we know that
[tex]R = \rho \frac{L}{A}[/tex]
here we know that the length of the cylinder is L and area is A so the value of current through the rod is given as
[tex]i = \frac{V A}{\rho L}[/tex]
now we have change the length of the conductor to twice of initial value and rest all parameters will remain the same
so we will have
[tex]i' = \frac{VA}{\rho (2L)}[/tex]
now from above two equations we have
[tex]\frac{i}{i'} = 2[/tex]
so new current will become
[tex]i' = \frac{i}{2}[/tex]
