A simple Physics question regarding Ohm's law. The resistivity of the conductor is inversely proportional to the area of the conductor. I would like to have a simple explanation for this.
How does resistivity increase if the area decreases in a conductor?
You mean: The resistance of a conductor is inversely proportional to the area. [Resistivity is a property of the material of which the conductor is made, and is independent of the size or shape of the conductor.]
You can imagine making up a cylindrical conductor from two strands of semicircular cross-section (running lengthways). If each strand has a resistance $R_{semi},$ then the complete conductor will have a resistance $R$ of $\frac{1}{2}R_{semi}$ because the strands are in parallel. [It doesn't matter that the strands are in contact all along and not just at the ends, because no current will flow between them.]
So a wire of twice the cross-sectional area (but the same length and material) has half the resistance.
You can easily extend the argument to show that resistance is inversely proportional to cross-sectional area (for a given length and material).
Think of the analogy of water flowing in a pipe. Water flows through a pipe more easily the greater the cross sectional area. Similarly, current will flow through a conductor more easily the greater the cross sectional area of the conductor.
However, it is the “resistance” of the conductor not its “resistivity” that varies inversely with the cross sectional area of the conductor. The “resistivity” of a conductor is a material property of the conductor.
The resistance of a conductor is given by
$$R=\frac {ρL}{A}$$
Where
$R$ = conductor resistance in Ohms
$ρ$ = the resistivity of the conductor material in Ohm-meter
$L$ = the length of the conductor in meters
$A$ = the cross sectional area of the conductor in square meters.
Hope this helps
I suppose you are concerned with homogeneous and isotropic ohmic conductors in the diffusive regime. As others have pointed out already, the (specific) resistivity is a material property independent of the dimensions of the specimen.
We are now going to think about how resistance depends on the cross sectional area of the conductor perpendicular to the direction of current flow. Suppose we apply a constant dc voltage to the conductor of cross sectional area $A$ and resistance $R_A$. Then the current flowing through it is given according to Ohm's law by $$ I_A = \frac{U}{R_A}.$$ This current is homogeneously distributed across the cross sectional area of the conductor. This property will now help us to draw the right conclusions.
If we reduce the cross sectional area of the same conductor to $a$ (say, we cut the rest of the conductor away), but keep the voltage $U$ the same, the current will be reduced in proportion to the area reduction, i.e., $$ I_a = \frac{a}{A}I_A = \frac{a}{A}\frac{U}{R_A}.$$ At the same time, the current $I_a$ is, according to Ohm's law, $$ I_a = \frac{U}{R_a},$$ where $R_a$ is the resistance of the resistor with reduced cross-sectional area. Comparing the two equations for $I_a$ we see that $$ R_a = \frac{R_AA}{a}.$$ Since in our problem, the product $R_AA$ is simply a constant given by the conductor with the initial cross section $A$, you see that the resistance $R_a$ of the conductor with reduced cross sectional area $a$ is inversely proportional to $a$.
