Radiation resistance of a small dipole current element of length "l" at a frequency of 3 GHz is 3 ohms. If the length is changed by 1%, then the percentage change in the radiation resistance, rounded off to two decimal places, is ____________ %.

This question was previously asked in

GATE EC 2019 Official Paper

CT 1: Ratio and Proportion

3742

10 Questions
16 Marks
30 Mins

**Concept:**

The radiation resistance of dipole is given by:

\({R_{rad}} = 80{\pi ^2}{\left( {\frac{{dl}}{λ }} \right)^2}\)

**Application:**

As \({R_{rad}} = 80{\pi ^2}{\left( {\frac{{dl}}{λ }} \right)^2}\) Taking log

log(R_{rad}) = log(80π^{2}) + 2 log dl – 2 log λ

Differentiating the above, we get:

\(\frac{{d{R_{rad}}}}{R} = \frac{{2dl}}{l}\) (As λ = constant, its derivative will be 0

Multiply both the sides by 100, the above equation becomes:

\(\frac{{d{R_{rad}}}}{R} \times 100 = 2\left( {\frac{{dl}}{l} \times 100} \right)\)

% R_{rad} = 2 × 1%

= 2%