Question

Let f(x)=-672 - 5x and g(x) = 3x + 8. What function represents a new function, h(x), for which h(x) = (+3)(x)?​

Answer 1

Answer:

Given f (x) = 3x + 2 and g(x) = 4 – 5x, find (f + g)(x), (f – g)(x), (f × g)(x), and (f / g)(x).

To find the answers, all I have to do is apply the operations (plus, minus, times, and divide) that they tell me to, in the order that they tell me to.

(f + g)(x) = f (x) + g(x)

= [3x + 2] + [4 – 5x]

= 3x + 2 + 4 – 5x

= 3x – 5x + 2 + 4

= –2x + 6

(f – g)(x) = f (x) – g(x)

= [3x + 2] – [4 – 5x]

= 3x + 2 – 4 + 5x

= 3x + 5x + 2 – 4

= 8x – 2

(f × g)(x) = [f (x)][g(x)]

= (3x + 2)(4 – 5x)

= 12x + 8 – 15x2 – 10x

= –15x2 + 2x + 8

\left(\small{\dfrac{f}{g}}\right)(x) = \small{\dfrac{f(x)}{g(x)}}(

g

f

)(x)=

g(x)

f(x)

= \small{\dfrac{3x+2}{4-5x}}=

4−5x

3x+2

Answer 2

Answer:

Given,

f(x)=672-5x and g(x)=3x+8

Equating both side for x

672-5x=3x+8

672-8=3x+5x

664=8x

x=664/8

x=83

Now,

h(x)=3*x

Putting value of x

h(x)=83*3

h(x) =249

Hope it will helpful