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Solve for f. d = 16ef² f=±4de‾‾‾√ f=±4de√e f=±de√4e f=±de√16
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Solve for f. d = 16ef² f=±4de‾‾‾√ f=±4de√e f=±de√4e f=±de√16

User M Newville
by
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2 Answers

1 vote

Answer:

The value of f out of given expression
d=16ef^2 is
(\pm 1)/(4)\sqrt{(d)/(e)}

Explanation:

Given : expression
d=16ef^2

We have to solve for f.

Consider the given expression
d=16ef^2

Divide both side by 16e, we get,


(d)/(16e)=f^2

Now, taking square root, both sides, we have,


\sqrt{(d)/(16e)}=√(f^2)

Simplify, we get,


\sqrt{(d)/(16e)}=f

We know
√(16)=\pm 4 , we get,


(\pm 1)/(4)\sqrt{(d)/(e)}=f

Thus, The value of f out of given expression
d=16ef^2 is
(\pm 1)/(4)\sqrt{(d)/(e)}

User Tinku
by
5.9k points
2 votes

Answer:
f=\pm (√(de))/(4e)

Explanation:

Here, the given expression is,


d=16ef^2

or
16ef^2=d


\implies f^2 =(d)/(16e)


\implies f=\pm\sqrt{(d)/(16e)}


\implies f =\pm (√(d))/(4√(e))


\implies f= \pm (√(de))/(4e) ( By rationalization )

Which is the required value of f.

User Drys
by
5.7k points
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