well the fractions made the graph decay, but the graph of all positive base functions were above the x axis, where as negative were all below. At b=1 or -1 the function is linear at x=1, -1. This is logical but still an odd occurrence.
The whole positive negative thing is hard to explain, because there is another difference. its kind of the same thing but its more universal. On negative functions the higher rates of change are smaller numbers where as on positive the higher rates of change, or steeper parts of the graphs are at larger numbers. I hope this makes sense to you all its hard to say.
Did you try positive fractional bases? Try a B of 1/2.
ReplyDeletewell the fractions made the graph decay, but the graph of all positive base functions were above the x axis, where as negative were all below. At b=1 or -1 the function is linear at x=1, -1. This is logical but still an odd occurrence.
ReplyDeleteThe whole positive negative thing is hard to explain, because there is another difference. its kind of the same thing but its more universal. On negative functions the higher rates of change are smaller numbers where as on positive the higher rates of change, or steeper parts of the graphs are at larger numbers. I hope this makes sense to you all its hard to say.
ReplyDelete