You can
put this solution on YOUR website!The graph of the basic exponential function (y = bx) has two distinctive characteristics:
a) having a y intercept of (0,1), and
b) having a horizontal asymptote of y=0.
Since inverse functions have their domains and ranges interchanged, what impact does this have for the graph of y = logb(x)
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y = logb(x) has a vertical asymptote at x=0 and no horizontal asymptote:
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Cheers,
Stan H.
You can
put this solution on YOUR website!Basic Form: y = a(b^x)
a) having a y intercept of (0,1)
y = a(b^x)
1 = a(b^0)
1 = a(1)
so: y = b^x
b) having a horizontal asymptote of y=0
All exponential equations in the form
have a horizontal asymptote as
.
is defined by any number...
Red Line: b = 2
Green Line: b = 3
Blue Line: b = 4
Since inverse functions have their domains and ranges interchanged, what impact does this have for the graph of y = logb(x).
~ y = b^x ~
Domain: All Reals
Range: y > 0
~ y = logb(x) ~
Domain: y > 0
Range: All Reals
Red Line: b = 2
Green Line: b = 3
Blue Line: b = 4
(