How do you solve #(x+5)^4 = 81#?

2 Answers
Mar 25, 2016

If we're only examining real numbers, the two solutions are #x=-2# and #x=-8#.

Explanation:

Take the #4#th root of both sides to undo the #4#th power on #(x+5)^4#.

#root4((x+5)^4)=root4 81#

Note that #81=3^4#. Thus, #root 4 81=+-3#. This is one of the trickier parts of the problem--recall that when you take an even root, both the positive and negative solutions are valid since both #(3)^4=81# and #(-3)^4=81#.

We are left with:

#x+5=+-3#

Split into two equations:

#x+5=3" "" "" "x+5=-3#

These give #x=-2# and #x=-8#, respectively.

Mar 25, 2016

Considering real and complex solutions, we obtain: #x=-8,-2,-5+-3i#

Explanation:

Take the square root of both sides. Recall to take the positive and negative roots.

#(x+5)^2=+-9#

Solving for the equation with #+9# by again taking the square root, we are left with the two equations:

#x+5=3" "" "" "x+5=-3#

Resulting in the two zeros #x=-2# and #x=-8#.

The other two zeros, which are complex, come from solving #(x+5)^2=-9#.

Taking the square root of both sides yields #x+5=+-3i#, so #x=-5+-3i#.