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Algebra of Functions
(operations of functions)
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Functions can be added, subtracted, multiplied and divided. Such procedures are referred to as "operations of functions" or "algebra of functions". These arithmetic procedures can be performed on two functions when the functions have the same domains (and no division by zero occurs).

falg1
Domains
domainalgfunc

The domain for each of these new functions will be the intersection (∩) of the domains
of functions f (x) and g(x). Basically speaking, you need to find where the domains overlap.
There is an additional stipulation for the domain of (f / g)(x) which states that g(x) cannot equal 0, to avoid a division by zero problem.


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Examples:

1. Given f (x) = 5x + 1 and g (x) = 3x - 2.
Express (f + g)(x);     (f - g)(x);     (f • g)(x);     (f / g)(x)
State the domain of each.

Solution:
(f + g)(x) = f (x) + g(x) = (5x + 1) + (3x - 2) = 8x - 1 
Domain: D(f ) = Reals and D(g) = Reals, so D(f + g) = D(f ) ∩ D(g) = Reals

(f - g)(x) = f (x) - g(x) = (5x + 1) - (3x - 2) = 2x + 3 
Domain: D(f ) = Reals and D(g) = Reals, so D(f + g) = D(f ) ∩ D(g) = Reals

 (f • g)(x) = f (x) • g(x) = (5x + 1) • (3x - 2) = 15x2 - 7x - 2 
Domain: D(f ) = Reals and D(g) = Reals, so D(f + g) = D(f ) ∩ D(g) = Reals

domainfega 
Domain: D(f ) = Reals and D(g) = Reals, but D(f + g) = D(f ) ∩ D(g) = Reals, but not x = 2/3
(The x = 2/3 creates a zero denominator problem with division by g(x).)

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2. domainaf2

Solution:
(f + g)(x) = f (x) + g(x) = domainaf22

(f + g)(4) = f (4) + g(4) = 19 + 3/2 = 20½

FYI: D(f + g)(x) = D(f) ∩ D(g) = (Reals) ∩ (Reals - {2}) = Reals - {2}

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3. Given the tables shown below:
x
2
4
6
8
f (x)
23
16
30
26
x
2
4
6
8
g(x)
28
32
-14
-22
Express (f + g)(6);     (f - g)(8);     (f • g)(2);     (f / g)(4)

Solution:
(f + g)(6) = f (6) + g(6) = 30 + (-14) = 16 

(f - g)(8) = f (8) - g(8) = 26 - (-22) = 48 

(f • g)(2) = f (2) • g(2) = 23 • 28 = 644 

(f / g)(4) = f (4) / g(4) = 16 / 32 = ½

FYI: The domains for all of these functions will be {2, 4, 6, 8}. There are no division by zero problems since neither f (x) nor g(x) ever equal 0.

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4. Given the graphs shown below on the interval [-4,4], with line segments connecting certain designated points whose x and y values are integers:
           afgraph4          afgprah
Express (f + g)( -2);     (f - g)(4);     (f • g)(-4);     (f / g)(2)

Solution:
(f + g)(-2) = f (-2) + g(-2) = 1 + 1 =

(f - g)(4) = f (4) - g(4) = -3 - (4) = -7 

(f • g)(-4) = f (-4) • g(-4) = 3 • (-4) = -12 

(f / g)(2) = f (2) / g(2) = 0 / (-3) = 0

FYI: The domains for the first three of these functions will be the interval [-4, 4]. The domain for the last function ( (f / g)(x) ) will be [-4,4] - {-10/3 , -1, 3}. There are three trouble spots (x-intercepts) where g(x) returns a zero answer causing division by zero. To find the x-intercept between -4 and -3, we need the equation of the segments connecting the points (-4,4) and (-3,2).
slopeeq

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ti84c
For calculator help with
algebra of functions
click here.


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