NVAEasyJEE 2023Transistors (BJT: Amplifier & Switch)

JEE Physics 2023 Question with Solution

From the given transfer characteristic of a transistor in CE configuration, the value of power gain of this configuration is 10x10^x, for RB=10kΩR_B = 10 \, k\Omega, RC=1kΩR_C = 1 \, k\Omega. The value of xx is _____.

Transfer characteristic graph of a transistor in CE configuration showing collector current in mA versus base current in microampere with plotted points from 100 microampere, 10 mA up to 500 microampere, 50 mA.

Answer

Correct answer:1

Step-by-step solution

Standard Method

Given: From the graph, IC=50mAI_C = 50 \, \text{mA} for IB=500μAI_B = 500 \, \mu\text{A}. Also, RB=10kΩR_B = 10 \, k\Omega and RC=1kΩR_C = 1 \, k\Omega.

Find: The value of xx if power gain =10x= 10^x.

In CE configuration,

Power gain=β×RCRB\text{Power gain} = \beta \times \frac{R_C}{R_B}

where

β=ICIB\beta = \frac{I_C}{I_B}

From the graph,

β=50×103500×106=100\beta = \frac{50 \times 10^{-3}}{500 \times 10^{-6}} = 100

Now,

Power gain=100×110=10\text{Power gain} = 100 \times \frac{1}{10} = 10

So,

10x=10=10110^x = 10 = 10^1

Hence,

x=1x = 1

Therefore, the required numerical value is 11.

Using Slope from the Given Point

Given: The transfer characteristic is a straight line passing through points such as (500μA,50mA)\left(500 \, \mu\text{A}, 50 \, \text{mA}\right).

Find: The value of xx.

The current gain is obtained from the ratio of collector current to base current:

β=ICIB\beta = \frac{I_C}{I_B}

Using the marked point,

IC=50mA=50×103AI_C = 50 \, \text{mA} = 50 \times 10^{-3} \, \text{A} IB=500μA=500×106AI_B = 500 \, \mu\text{A} = 500 \times 10^{-6} \, \text{A}

Therefore,

β=50×103500×106=102=100\beta = \frac{50 \times 10^{-3}}{500 \times 10^{-6}} = 10^2 = 100

Now use the power gain relation for CE configuration:

Power gain=βRCRB\text{Power gain} = \beta \frac{R_C}{R_B}

Substituting RC=1kΩR_C = 1 \, k\Omega and RB=10kΩR_B = 10 \, k\Omega,

Power gain=100×1kΩ10kΩ=100×110=10\text{Power gain} = 100 \times \frac{1 \, k\Omega}{10 \, k\Omega} = 100 \times \frac{1}{10} = 10

Since the power gain is written as 10x10^x,

10x=1010^x = 10

Thus,

x=1x = 1

The correct answer extracted from the working is 11. The raw listed answer showing 33 disagrees with the solution working.

Common mistakes

  • Using IB=500mAI_B = 500 \, \text{mA} instead of 500μA500 \, \mu\text{A} is incorrect because the graph labels base current in microampere. Convert units carefully before finding β\beta.

  • Taking power gain equal to only β\beta is wrong because in CE configuration here it depends on both current gain and the resistance ratio. Use βRCRB\beta \dfrac{R_C}{R_B}, not only β\beta.

  • Reversing the resistance ratio as RBRC\dfrac{R_B}{R_C} gives an incorrect result. The required expression uses RCRB\dfrac{R_C}{R_B}, so substitute the values in the correct order.

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