InterviewSolution
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InterviewSolution
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There are 21 marks (zero to 20) on the dial of a galvanometer, that is there are 20 divisions. On passing 10muA current through it, it shows a deflection of 1 division. Its resistance is 20Omega. (a) How can it be converted into an ammeter which can measure 1 A current ? (b) How can we change it into a voltmeter to measure a pd of 1 V ? Also find the effective resistance of both of the above mentioned meters. |
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Answer» Solution :1. When a current of `10MUA` passes through the galvanometer, its pointer shows a deflection of 1 division. There are 20 divisions in this galvanometer. `therefore` The maximum current which can be measured by it (current capacity) `I_(G)=10xx10^(-6)xx20=200xx10^(-6)A`. 2. For ammeter, the REQUIRED shunt to be joined in parallel to galvanometer is, `S=(GI_(G))/(I-I_(G))` = `(20xx200xx10^(-6))/(10000xx10^(-4)xx10^(-4))` = `(20xx2xx10^(-4))/(10000xx10^(-4)xx10^(-4))` = `40/9998~~0.004Omega` `I_(G)=200xx10^(-6)A` = `2xx10^(-4)A` `G=20Omega` I = 1 A = `10000xx10^(-4)A` 3. THUS to convert this galvanometer into an ammeter which can measure 1A current, a shunt of `0.004Omega` should be joined. The effective resistance of this ammeter will be `G.=(GS)/(G+S)=(20xx0.004)/(20+0.004)~~0.004Omega`. 4. In order to convert the galvanometer into a voltmeter, the required series resistance is `R_(S)=V/I_(G)-G` = `1/(2xx10^(-4))-20` = `0.5xx10^(4)-20` = 5000 - 20 = `4980Omega` Here, V = 1 volt `I_(G)=2xx10^(-4)A` `G=20Omega` 5. In order to convert this galvanometer into a voltmeter which can measure 1 volt, a series resistance of 4920 should be joined with it. The effective resistance of this voltmeter will be `R._(S)=R_(S)+G=4980+20=5000Omega`. (`thereforeR_(S)` and G are in series) |
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