Register
Solve for f. d = 16ef² f=±4de‾‾‾√ f=±4de√e f=±de√4e f=±de√16
164k views
1 vote
Solve for f. d = 16ef² f=±4de‾‾‾√ f=±4de√e f=±de√4e f=±de√16

User M Newville
by
7.8k points

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
7.4k 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
7.2k points
Ask a Question
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.

8.5m questions

11.2m answers

Other Questions

How do you can you solve this problem 37 + y = 87; y =
What is .725 as a fraction
A bathtub is being filled with water. After 3 minutes 4/5 of the tub is full. Assuming the rate is constant, how much longer will it take to fill the tub?
i have a field 60m long and 110 wide going to be paved i ordered 660000000cm cubed of cement  how thick must the cement be to cover field
Write words to match the expression. 24- ( 6+3)
Link Copied!