1 Answer

Ajit Satarkar · Answer 1 · 2022-10-08T01:37:17+0000

Answer:

f = (720)/(11)

Explanation:

Given

$f\ \alpha\ (\sqrt T)/(L)$ --- The variation

f = 60; T = 121; L = 12

Required

Find f, when T =81; L = 9

We have:

$f\ \alpha\ (\sqrt T)/(L)$

Express as equation

$f = k(\sqrt T)/(L)$

Make k the subject

$k = (fL)/(\sqrt T)$

When
f = 60; T = 121; L = 12

$k = \frac{60 * 12}{\sqrt {121}}$

k = (60 * 12)/(11)

k = (720)/(11)

To solve for f, when T =81; L = 9

We have:

$f = k(\sqrt T)/(L)$

f = (720)/(11) * (√(81))/(9)

f = (720)/(11) * (9)/(9)

f = (720)/(11) * 1

f = (720)/(11)

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