Time period of a simple pendulum in a stationary lift is ' T '. If the lift accelerates with frac{ g }{6} vertically upwards then

Q: Time period of a simple pendulum in a stationary lift is ' $T$ '. If the lift accelerates with $\frac{ g }{6}$ vertically upwards then the time period will be ..... (where $g =$ acceleration due to gravity)

c $T =2 \pi \sqrt{\frac{\ell}{ g _{\text {eff }}}}$ $(a)$ when $a =0, T =2 \pi \sqrt{\frac{\ell}{ g }}$ $(b)$ when $a =\frac{ g }{6}, T ^{\prime}=2 \pi \sqrt{\frac{\ell}{ g +\frac{ g }{6}}}$ $\therefore T ^{\prime}=\sqrt{\frac{6}{7}} T$

SECTION - A [PHYSICS - MCQ]

GSEB - English Medium

Time period of a simple pendulum in a stationary lift is ' $T$ '. If the lift accelerates with $\frac{ g }{6}$ vertically upwards then the time period will be .....

(where $g =$ acceleration due to gravity)

A$\sqrt{\frac{6}{5}} T$
B$\sqrt{\frac{5}{6}} T$
C$\sqrt{\frac{6}{7}} T$
D$\sqrt{\frac{7}{6}} T$

JEE MAIN 2022, Medium

STD 11 Science
NEET
STD 11 - 13. oscillations
Physics

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