MCQEasyJEE 2023Electric Current & Drift Velocity

JEE Physics 2023 Question with Solution

The charge flowing in a conductor changes with time as

Q(t)=αtβt2+γt3,Q(t) = \alpha t - \beta t^2 + \gamma t^3,

where α,β,γ\alpha, \beta, \gamma are constants. The minimum value of current is:

  • A

    α3β2γ\alpha - \frac{3\beta^2}{\gamma}

  • B

    αγ23β\alpha - \frac{\gamma^2}{3\beta}

  • C

    βα23γ\beta - \frac{\alpha^2}{3\gamma}

  • D

    αβ23γ\alpha - \frac{\beta^2}{3\gamma}

Answer

Correct answer:B

Step-by-step solution

Standard Method

Given:

Q(t)=αtβt2+γt3Q(t) = \alpha t - \beta t^2 + \gamma t^3

Find: The minimum value of current.

Current is the rate of flow of charge, so

I(t)=dQdt=α2βt+3γt2I(t) = \frac{dQ}{dt} = \alpha - 2\beta t + 3\gamma t^2

For the minimum value of current, differentiate I(t)I(t) with respect to tt and set it equal to zero:

dIdt=2β+6γt=0\frac{dI}{dt} = -2\beta + 6\gamma t = 0

This gives

t=β3γt = \frac{\beta}{3\gamma}

Substitute this value of tt into I(t)I(t):

Imin=α2β(β3γ)+3γ(β3γ)2I_{\min} = \alpha - 2\beta \left(\frac{\beta}{3\gamma}\right) + 3\gamma \left(\frac{\beta}{3\gamma}\right)^2 Imin=α2β23γ+β23γI_{\min} = \alpha - \frac{2\beta^2}{3\gamma} + \frac{\beta^2}{3\gamma} Imin=αβ23γI_{\min} = \alpha - \frac{\beta^2}{3\gamma}

Therefore, the minimum current is αβ23γ\alpha - \frac{\beta^2}{3\gamma}. The solution states the correct option is B, but this expression matches option D in the listed options, so the option labels on the solution's are inconsistent.

Why the Extremum is Minimum

Since

I(t)=α2βt+3γt2I(t) = \alpha - 2\beta t + 3\gamma t^2

is a quadratic expression in tt with coefficient of t2t^2 equal to 3γ3\gamma, it opens upward when γ>0\gamma > 0. Hence the stationary value at

t=β3γt = \frac{\beta}{3\gamma}

is the minimum value of current.

Common mistakes

  • Differentiating Q(t)Q(t) incorrectly to get current. Current is I=dQdtI = \frac{dQ}{dt}, not QQ itself. Always differentiate the charge function first.

  • Setting dQdt=0\frac{dQ}{dt} = 0 directly to find the minimum current. That gives where current may be zero, not where current is minimum. To minimize current, differentiate I(t)I(t) and solve dIdt=0\frac{dI}{dt} = 0.

  • Choosing the option label from the solution without checking the expression. Here the worked result is αβ23γ\alpha - \frac{\beta^2}{3\gamma}, which matches option D in the given list even though the solution says B.

Practice more Electric Current & Drift Velocity questions

Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.

Related questions