A metallic strain-gauge (SG) with resistance \( R_{SG} \) is connected as shown in the figure, where \( R_{L1} \), \( R_{L2} \), \( R_{L3} \) represent the lead wire resistances. The SG has a gauge factor of 2 and nominal resistance \( R_N \) of \( 125 \, \Omega \). When the SG is subjected to a tensile strain of \( 2 \times 10^{-3} \), the resulting change in \( R_{SG} \) is \( \Delta R \). The \( \Delta R \) value is measured as \( \Delta R_{MEAS} = R_{EQ2} - R_{EQ1} \). The \( R_{EQ1} \) and \( R_{EQ2} \) are the equivalent resistances measured between the terminals 1 and 2, and terminals 2 and 3, respectively.
If \( R_{L1} = R_{L2} = 5 \, \Omega \), and \( R_{L3} = 4.95 \, \Omega \), the measured value of tensile strain is ________ \( \times 10^{-3} \) (rounded off to two decimal places).
