SOLUTION: simplify the expression log3 (x+1) -log3 (3x^2-3x-6)+log3 (x-2) The 3 on each log is lowered

Question 1026110: simplify the expression
log3 (x+1) -log3 (3x^2-3x-6)+log3 (x-2)
The 3 on each log is lowered
Answer by josgarithmetic(39620) (Show Source): You can put this solution on YOUR website!
log3 (x+1) -log3 (3x^2-3x-6)+log3 (x-2)

The 3 on each log is lowered
The 3 next to each "log" is the base for the logarithm.

log(3,(x+1))-log(3,(3x^2-3x-6))+log(3,(x-2))

RELATED QUESTIONS
log3(3x+6)-log3(x-6)=2 (answered by Marth,nerdybill)

log3 (3x+14) −log3 (5) =log3 (2) +log3 (x)... (answered by Alan3354)

Log3(3x+8)=log3(x^2+x) (answered by ewatrrr)

solve:... (answered by nerdybill)

solve log3(x-3) + log3(x+2) = log3... (answered by rothauserc)

Solve the logarithmic equation for x. log3 4 + log3 x = log3 6 + log3(x −... (answered by stanbon,nakaguma)

log3 (x^2... (answered by tommyt3rd)

Log3(x+1)-log3(x)+log3(3) (answered by Alan3354)

log3 (x+2) + log3 (x-2) =... (answered by stanbon)