On interchanging the resistances, the balance point of a meter bridge shifts to the left by 10 cm. The resistance of their series combination is

Q: On interchanging the resistances, the balance point of a meter bridge shifts to the left by $10\ cm$. The resistance of their series combination is $1\ k\Omega$. How much was the resistance on the left slot before interchanging the resistances? .................. $\Omega$

b $\mathrm{R}_{1}+\mathrm{R}_{2}=1000$ $\Rightarrow \mathrm{R}_{2}=1000-\mathrm{R}_{1}$ On balancing condition $\mathrm{R}_{1}(100-I)=\left(1000-\mathrm{R}_{1}\right) l$ ...$(i)$ On Interchaanging resistance balance point shifts left by $10 \,cm$ On balancing condition $\left(1000-R_{1}\right)(110-l)=R_{1}(l-10)$ or, $\mathrm{R}_{1}(l-10)=\left(1000-\mathrm{R}_{1}\right)(110-l) \ldots(\mathrm{ii})$ Dividing eqn $(i)$ by $(ii)$ $\frac{100-l}{l-10}=\frac{l}{110-l}$ $\Rightarrow \quad(100-l)(110-l)=l(l-10)$ $ \Rightarrow 11000 - 100l - 110l + {l^2} = {l^2} - 10l$ $\Rightarrow 11000=200 l$ or, $l=55$ Putting the value of $'l'{\rm{in}}\,{\rm{eqn}}(i)$ $\mathrm{R}_{1}(100-55)=\left(1000-\mathrm{R}_{1}\right) 55$ $\Rightarrow \mathrm{R}_{1}(45)=\left(1000-\mathrm{R}_{1}\right) 55$ $\Rightarrow \mathrm{R}_{1}(9)=\left(1000-\mathrm{R}_{1}\right) 11$ $\Rightarrow 20 \mathrm{R}_{1}=11000$ $\therefore \quad \mathrm{R}_{1}=550\, \mathrm{K\Omega}$

SECTION - A [PHYSICS MCQ]

GSEB - English Medium

On interchanging the resistances, the balance point of a meter bridge shifts to the left by $10\ cm$. The resistance of their series combination is $1\ k\Omega$. How much was the resistance on the left slot before interchanging the resistances? .................. $\Omega$

A$505 $
B$550$
C$910$
D$990$

JEE MAIN 2018, Diffcult

STD 11 Science
JEE
STD 12 - 3. current electricity
Physics

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