How do you solve #e^x-9=19#?

1 Answer
Aug 30, 2017

Real solution:

#x = ln 28#

Complex solutions:

#x = ln 28 + 2npii" "n in ZZ#

Explanation:

Given:

#e^x-9 = 19#

Add #9# to both sides to get:

#e^x = 28#

Take the natural log of both sides to get:

#x = ln(28)#

More generally note that:

#e^(x+2npii) = e^x*e^(2npii) = e^x" "# for any integer #n#

So if we include complex solutions, we have:

#x = ln 28+2npii" "n in ZZ#