Assertion-Reason 2

Electricity and Magnetism Level 2

Consider an asymmetrically charged ring with point P P on the axis at a distance x x from the center of the ring.

Statement 1

Electric Field at point P P is independent of the distribution of the charge on the ring.

Statement 2

E = d E cos θ E=\int { dE\cos { \theta } }

x 4 π ε 0 ( r 2 + x 2 ) 3 / 2 d Q \int { \frac { x }{ 4\pi { \varepsilon }_{ 0 }{ \left( { r }^{ 2 }+{ x }^{ 2 } \right) }^{ 3/2 } } dQ }

x 4 π ε 0 ( r 2 + x 2 ) 3 / 2 d Q \frac { x }{ 4\pi { \varepsilon }_{ 0 }{ \left( { r }^{ 2 }+{ x }^{ 2 } \right) }^{ 3/2 } } \int { dQ }

x 4 π ε 0 ( r 2 + x 2 ) 3 / 2 Q \frac { x }{ 4\pi { \varepsilon }_{ 0 }{ \left( { r }^{ 2 }+{ x }^{ 2 } \right) }^{ 3/2 } } Q

Statement 1 is incorrect while Statement 2 is correct. Statement 1 is correct while Statement 2 is incorrect. Both the statements are incorrect. Both the statements are correct and Statement 2 is the correct explanation of Statement 1. Both the statements are correct but Statement 2 is the incorrect explanation of Statement 1.

Abhishek Sharma by Abhishek Sharma , 22, India

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