SOLUTION: Solve the indicial linear equation 9^(-1/2)=27^(1/4)÷3^(x+1)

Question 1198056: Solve the indicial linear equation 9^(-1/2)=27^(1/4)÷3^(x+1)
Found 2 solutions by ewatrrr, ikleyn:
Answer by ewatrrr(24785) (Show Source): You can put this solution on YOUR website!

3^(x+1) = 3^(7/4)
x+1 = 7/4
x = 3/4 agreed... Got carried away with my }}}
Answer by ikleyn(52781) (Show Source): You can put this solution on YOUR website!
.
Solve the indicial linear equation 9^(-1/2) = 27^(1/4)÷3^(x+1)
~~~~~~~~~~~~~~~~~

= = x+1 = 1 + x = . ANSWER

Solved.

RELATED QUESTIONS
Solve the indicial linear equation... (answered by ankor@dixie-net.com)
solve the indicial equation -- 5^x =... (answered by Edwin McCravy)
using the law of logarithms, solve for the following indicial equation for x each correct (answered by DrBeeee)
SOLVE THE INDICIAL EQUATION USING LOGARATHM... (answered by engsaoudah)
Solve the indicial linear equation 5√8^2x=128^x X... (answered by Alan3354,ankor@dixie-net.com,MathTherapy)
-1/9(x-27)+1/3(x+3)=x-3 Please help solve the... (answered by stanbon)
Solve the equation... (answered by tutorcecilia)
Solve the equation.... (answered by checkley71)
Linear Inequalities Solve for x 1. 3(x+1)< 18 2. x+7- 8x -9> 3(x-7) 3. Whats (answered by oscargut)