the time period of an oscillating body is T how will the time of the period vibrating body change if the value of G is decreased by 9 times

asked Jul 10, 2022 4.6k views

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$\\ \sf\longmapsto T_1=2\pi \sqrt{(m)/(g)}$

$\\ \sf\longmapsto T_1=2\pi \sqrt{(m)/(x)}$

$\\ \sf\longmapsto T_2=2\pi \sqrt{(m)/(G)}$

$\\ \sf\longmapsto T_2=2\pi \sqrt{(m)/(9x)}$

Now

$\\ \sf\longmapsto (T_1)/(T_2)=\frac{2\pi \sqrt{(m)/(x)}}{2\pi \sqrt{(m)/(9x)}}$

$\\ \sf\longmapsto (T_1)/(T_2)=(1)/(9)$

$\\ \sf\longmapsto T_1:T_2=1:9$

The time period will increase by 9 times

Halim Qarroum answered Jul 15, 2022

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