Physics-
General
Easy
Question
Equivalent resistance between points P and Q in the adjoining figure is
![](data:image/png;base64,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)
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The correct answer is: 1
Related Questions to study
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The S.I. unit of surface charge density is _____.
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chemistry-
Find the final product Z of the following reaction![](data:image/png;base64,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)
Find the final product Z of the following reaction![](data:image/png;base64,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)
chemistry-General
chemistry-
Coupling with diazonium salts of the following takes place in the order of
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)
Coupling with diazonium salts of the following takes place in the order of
![](data:image/png;base64,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)
chemistry-General
chemistry-
in the above reaction (A)and (B)are
in the above reaction (A)and (B)are
chemistry-General
chemistry-
Dehydrohalogenation of the following in increasing order
![](data:image/png;base64,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)
Dehydrohalogenation of the following in increasing order
![](data:image/png;base64,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)
chemistry-General
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chemistry-General
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chemistry-General
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chemistry-General
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chemistry-General
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chemistry-
The correct statement about the compounds A, (B)and C is
![](data:image/png;base64,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)
The correct statement about the compounds A, (B)and C is
![](data:image/png;base64,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)
chemistry-General
chemistry-
is
is
chemistry-General
chemistry-
2Fe+3(aq) + Sn+2(aq) ¾→ 2Fe+2(aq) + ? The missing term in this reaction is
2Fe+3(aq) + Sn+2(aq) ¾→ 2Fe+2(aq) + ? The missing term in this reaction is
chemistry-General