Find (f*g)(x) when f(x)=x^2-7x+12 and g(x)=3/x^2-16

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asked Dec 14, 2019 28.1k views

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Imthath · Answer 1 · 2019-12-20T10:21:05+0000

The answer is:

Step-by-step explanation

Given functions are.......

f(x)=x^2-7x+12

g(x)= (3)/(x^2-16)

For finding
(f*g)(x) , we just need to multiply the two functions
f(x) and
g(x) . So......

$(f*g)(x)= f(x)*g(x)\\ \\ (f*g)(x)= (x^2-7x+12)((3)/(x^2-16))\\ \\ (f*g)(x)= [(x-3)(x-4)][(3)/((x+4)(x-4))]\\ \\ (f*g)(x)= (3(x-3))/(x+4) = (3x-9)/(x+4)$

Find (f*g)(x) when f(x)=x^2-7x+12 and g(x)=3/x^2-16

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