A) Linear with slope \[-{{\text{R}}_{\text{H}}}\]
B) Linear with intercept \[-{{\text{R}}_{\text{H}}}\]
C) None linear
D) Linear with slope \[{{\text{R}}_{\text{H}}}\]
Correct Answer: D
Solution :
\[\frac{1}{\lambda }\,=\,\bar{v}\,=\,\text{R}{{ & }_{H}}{{z}^{2}}\left( \frac{1}{\eta _{1}^{2}}\,-\,\frac{1}{\eta _{2}^{2}} \right)\] |
\[\bar{v}\,=\,{{\text{R}}_{H}}\times \left( \frac{1}{\eta _{1}^{2}}\,-\,\frac{1}{{{8}^{2}}} \right)\] |
\[\bar{v}\,=\,{{\text{R}}_{\text{H}}}\times \,\frac{1}{{{\eta }^{2}}}-\,\frac{{{\text{R}}_{\text{H}}}}{{{8}^{2}}}\,\]\[\Rightarrow \] \[\bar{v}\,=\,{{\text{R}}_{H}}\times \frac{1}{{{\eta }^{2}}}\,-\,\frac{{{\text{R}}_{H}}}{64}\] |
\[m={{R}_{H}}\] |
Linerar with slope \[{{\text{R}}_{\text{H}}}.\] |
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