The charge flowing through a resistor R varies with time t as Q = 3t -6t^2. The heat produced in R till the current in

Q: The charge flowing through a resistor $R$ varies with time $t$ as $Q = 3t -6t^2.$ The heat produced in $R$ till the current in it becomes zero is

a $\mathrm{i}=\frac{\mathrm{d} Q}{\mathrm{dt}}=3-12 \mathrm{t}$ $t=\frac{1}{4} \sec$ $\mathrm{H}-\int_{0}^{1 / 4}(3-12 \mathrm{t})^{2} \times \mathrm{Rdt}$ $=\left.\frac{(3-12 t)^{2}}{3 x-12}\right|_{0} ^{1 / 4} R$ $=\frac{+1}{36}[27]=\frac{3 \mathrm{R}}{4}$

SECTION - A [PHYSICS MCQ]

GSEB - English Medium

The charge flowing through a resistor $R$ varies with time $t$ as $Q = 3t -6t^2.$ The heat produced in $R$ till the current in it becomes zero is

A$\frac{3R}{4}$
B$\frac{3R}{2}$
C$\frac{4R}{4}$
D$\frac{9R}{4}$

Medium

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

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