What does x equal if #log(7x)=2#?

2 Answers

#x=100/7#

Explanation:

#log7x=2#

But #2=log100# (because #10^2=100#) hence

#log7x=log100#

By inyectivity of log function we can say that #7x=100#

#x=100/7#

This a valid solution because #log(7·100/7)=log100=2#

May 17, 2018

#x=100/7#

Explanation:

We have #log_10(7x)=2#

which can be rewritten as

#10^2=7x#

#=>100=7x#

Dividing both sides by #7#, we get

#x=100/7#

Hope this helps!