SOLUTION: Evaluate the logarithmic equation for three values of x that are less than -1, three values of x that are between 0 and -1, and at x = -1. Show your work. Use the resulting ordered

Algebra ->  Logarithm Solvers, Trainers and Word Problems -> SOLUTION: Evaluate the logarithmic equation for three values of x that are less than -1, three values of x that are between 0 and -1, and at x = -1. Show your work. Use the resulting ordered      Log On


   



Question 249519: Evaluate the logarithmic equation for three values of x that are less than -1, three values of x that are between 0 and -1, and at x = -1. Show your work. Use the resulting ordered pairs to plot the graph; submit the graph via the Dropbox. State the equation of the line asymptotic to the graph (if any).
y = -log3.5 (-x) The 3.5 is a, or the subscript
Thank you for any help you can offer.


Answer by Theo(13342) About Me  (Show Source):
You can put this solution on YOUR website!
your equation is:

y = -log(3.5,(-x))

graph of this equation looks like this:

graph+%28600%2C600%2C-5%2C5%2C-5%2C5%2C-log%283.5%2C%28-x%29%29%29

you can use the conversion formula to change the base of the logarithm so you can solve it using your calculator.

the conversion formula is:

log(a,(x)) = log(b,x) / log(b,a)

what this formula says is:

log of x to the base of a equals the log of x to the base of b divided by the log of a to the base of b.

in your problem, this conversion formula becomes:

-log(3.5,(-x)) = - (log(10,(-x)) / log(10,3.5)

you can now use your calculator to solve for selected points of that log.

you get:

y = - (log(10,(-x)) / log(10,3.5)

substitute the following values for x:

y = - (log(10,-(-4)) / log(10,3.5) = -1.106589511

y = - (log(10,-(-3)) / log(10,3.5) = -.87695144

y = - (log(10,-(-2)) / log(10,3.5) = -.553294756

y = - (log(10,-(-1)) / log(10,3.5) = -0

y = - (log(10,-(-.1)) / log(10,3.5) = 1.838005394

y = - (log(10,-(-.0000001)) / log(10,3.5) = 12.86603776

the graph appears to be asymptotic at x = 0

the closer you get to 0, the bigger y gets.

the value of y is undefined at x = 0

all you need to do is plot the points on a piece of graph paper and draw the resulting curve.