I stumbled across this function
f(x)=(x^2+8x+16)/(x^2+x-12)
Factoring this:
=[(x+4)^2]/[(x+4)(x-3)]
=(x+4)/(x-3)
where x cannot equal -4 and 3
Since I cancelled x+4, there is a hole at x =-4
Therefore there is a vertical asymptote at x=3
Solving for the y value at x=-4 (hole), y=0
There is a horizontal asymptote at x=1
This is where I was confused:
to check for crossovers on the HA, I set 1=f(x)
Here I got x=-4 which is the x value of the hole.
Basically, my question is: How come there is a hole at (-4,0) and then a possible crossover at (-4,1)?
f(x)=(x^2+8x+16)/(x^2+x-12)
Factoring this:
=[(x+4)^2]/[(x+4)(x-3)]
=(x+4)/(x-3)
where x cannot equal -4 and 3
Since I cancelled x+4, there is a hole at x =-4
Therefore there is a vertical asymptote at x=3
Solving for the y value at x=-4 (hole), y=0
There is a horizontal asymptote at x=1
This is where I was confused:
to check for crossovers on the HA, I set 1=f(x)
Here I got x=-4 which is the x value of the hole.
Basically, my question is: How come there is a hole at (-4,0) and then a possible crossover at (-4,1)?
