MCQEasyJEE 2026SI System & Derived Units

JEE Physics 2026 Question with Solution

If ε0\varepsilon_0, EE and tt represent the free space permittivity, electric field and time respectively, then the unit of ε0Et\frac{\varepsilon_0 E}{t} will be

  • A

    A/mA/m

  • B

    Am2A m^2

  • C

    A/m2A/m^2

  • D

    AmA m

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: ε0\varepsilon_0 is free space permittivity, EE is electric field, and tt is time.

Find: The unit of ε0Et\frac{\varepsilon_0 E}{t}.

Step 1: Write the units of each quantity.

Free space permittivity:

[ε0]=CV m[\varepsilon_0] = \frac{\text{C}}{\text{V m}}

Electric field:

[E]=Vm[E] = \frac{\text{V}}{\text{m}}

Time:

[t]=s[t] = \text{s}

Step 2: Find the unit of ε0E\varepsilon_0 E.

[ε0E]=CV m×Vm=Cm2[\varepsilon_0 E] = \frac{\text{C}}{\text{V m}} \times \frac{\text{V}}{\text{m}} = \frac{\text{C}}{\text{m}^2}

Step 3: Divide by time.

[ε0Et]=Cm2s\left[\frac{\varepsilon_0 E}{t}\right] = \frac{\text{C}}{\text{m}^2 \text{s}}

Since

1A=Cs1\, \text{A} = \frac{\text{C}}{\text{s}}

we get

[ε0Et]=Am2\left[\frac{\varepsilon_0 E}{t}\right] = \frac{\text{A}}{\text{m}^2}

Therefore, the correct option is C and the unit is A/m2A/m^2.

Unit Cancellation Trick

Given: ε0\varepsilon_0, EE, and tt.

Find: The unit of ε0Et\frac{\varepsilon_0 E}{t}.

Use direct unit cancellation:

ε0CV m,EVm\varepsilon_0 \to \frac{\text{C}}{\text{V m}}, \qquad E \to \frac{\text{V}}{\text{m}}

Multiplying gives

CV m×Vm=Cm2\frac{\text{C}}{\text{V m}} \times \frac{\text{V}}{\text{m}} = \frac{\text{C}}{\text{m}^2}

Now divide by t=st = \text{s}:

Cm2s=Am2\frac{\text{C}}{\text{m}^2 \text{s}} = \frac{\text{A}}{\text{m}^2}

This works because V\text{V} cancels immediately, and Cs\frac{\text{C}}{\text{s}} is the definition of ampere. Therefore, the correct option is C.

Common mistakes

  • Using the unit of electric field incorrectly as V m\text{V m} or V\text{V}. This is wrong because electric field has unit \frac{\text{V}}\text{m}. Always write [E]=Vm[E] = \frac{\text{V}}{\text{m}} before multiplying.

  • Forgetting to divide by time at the final step. This is wrong because the expression is ε0Et\frac{\varepsilon_0 E}{t}, not just ε0E\varepsilon_0 E. First find [ε0E][\varepsilon_0 E] and then divide by s\text{s}.

  • Not converting Cs\frac{\text{C}}{\text{s}} into ampere. This is wrong because the final unit should be expressed in standard electrical form. Use 1A=Cs1\, \text{A} = \frac{\text{C}}{\text{s}} to get Am2\frac{\text{A}}{\text{m}^2}.

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