How do you solve #2^(x/17) = 0.8#?

1 Answer
Jul 15, 2016

#x = (17ln(0.8))/(ln2) ≈ -5.4727#

Explanation:

To solve for #x#, we first have to get rid of the exponent #x/17#. We can do this by taking the natural logarithm of both sides.

#2^(x/17) = 0.8#

#ln(2) * (x)/(17) = ln(0.8)#

Multiplying both sides by #17# makes the left-hand side easier to solve for #x#, giving us

#ln(2) * x = 17ln(0.8)#

Dividing both sides by #ln(2)# isolates the #x#-term, so we now have

#x = (17ln(0.8))/(ln2) ≈ -5.4727#