Two resistors A and B have resistances `R_(A) and R_(B)`respectively with `R_(A)lt(R_(B)`.the resistivities of their materials are `(rho_A) and (rho_B)`.

Two resistors A and B have resistances R_(A) and R_(B) respectively with R_(A)ltR_(B) .the resistivities of their materials are (rho_A) and (rho_B) .

Two resistors A and B have resistances R_(A) and R_(B) respectively with R_(A)ltR_(B) .the resistivities of their materials are (rho_A) and (rho_B) .

Two soap bubbles A and B have radii r_(1) and r_(2) respectively. If r_(1) lt r_(2) than the excess pressure inside

If resistors of resistance R_(1) and R_(2) are connected in parallel,then resultant resistance is "

The resistance of A and B are R_A and R_B and R_A < R_B the electrical resistivities are S_A and S_B then the correct explanation is

The temperature coefficient of resistance for two material A and B are 0.0031^(@)C^(-1) and 0.0068^(@)C^(-1) respectively .Two resistance R_(1) and R_(2) made from material A and B respectively . Have resistance of 200 Omega and 100 Omega at 0^(@)C . Show as a diagram the colour cube of a carbon resistance that would have a resistance equal to the series combination of R_(1) and R_(2) at a temperature of 100^(@)C (Neglect the ring corresponding to the tolerance of the carbon resistor)

The temperature coefficient of resistance for two material A and B are 0.0031^(@)C and 0.0068^(@)C^(-1) respectively .Two resistance R_(1) and R_(2) made from material A and B respectively . Have resistance of 200 Omega and 100 Omega at 0^(@)C . Show as a diagram the colour cube of a carbon resistance that would have a resistance equal to the series combination of r_(1) and R_(2) at a temperature of 100^(@)C (Neglect the ring corresponding to the tolerance of the carbon resistor)

Two resistors of resistance R_(1) and R_(2) having R_(1) gt R_(2) are connected in parallel. For equivalent resistance R, the correct statement is