Can anyone help me out?

I'm going to take a stab at this hoping that I get it right! Looking at your graph, you see a hole at x = 3. That means that that is a removable discontinuity. This results from the factor (x-3) canceling out between the numerator and the denominator of the rational function. The other discontinuity is found at the vertical asymptote at x = -4, which in factorization form is (x+4). That means that the 2 factors in the denominator are (x-3) and (x+4). If you factor the numerator you see that the factors are (x-3)(x-1), hence the reason that there is a hole in the graph at x = 3. If you FOIL out (x-3)(x+4) you get

[tex] x^2+x-12 [/tex]

so a = 1 and b = -12. Again, I THINK that's correct...

rejkjavik rejkjavik · Answer 2 · 2018-07-31T03:22:00+02:00

we are given

[tex] f(x)=\frac{x^2-4x+3}{x^2+ax+b} [/tex]

we need to find a and b

we can see that there is a hole at x=3

It means that (x-3) will be factor in both numerator and denominator

so, if we plug x=3 in the denominator we will get denominator value as 0

[tex] (3)^2+3a+b=0 [/tex]

[tex] 3a+b=-9 [/tex].........(1)

we can see that

there is a vertical asymptote at x=-4

so, denominator must be zero at x=-4

[tex] (-4)^2-4a+b=0 [/tex]

[tex] -4a+b=-16 [/tex].........(2)

we can subtract equation-1 and equation-2

we will get

[tex] a=1 [/tex]

now, we can find b

[tex] 3*1+b=-9 [/tex]

[tex] b=-12 [/tex]

so, we will get

[tex] a=1 [/tex]

[tex] b=-12 [/tex]..............Answer