\(\frac{\text{NSL}}{M}\)
\(\frac{N^2SL}{M^2}\)
\(\frac{N^2SL}{M}\)
\(\frac{NSL}{M^2}\)
Correct answer is B
M = N \(\sqrt{\frac{SL}{T}}\),
make T subject of formula square both sides
M\(^{2}\) = \(\frac{N^2SL}{T}\)
TM\(^{2}\) = N\(^{2}\)SL
T = \(\frac{N^2SL}{M^2}\)
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