Answer:
(a + b) = 8x +4
(a - b) = -2x +16
(a * b) = [tex]15x^{2}+32x-60[/tex]
Step-by-step explanation:
We have been given the functions;
a(x) = 3x + 10 and b(x) = 5x − 6
Part A:
(a + b) = a(x) + b(x) # we simply add the two given functions
(a + b) = 3x + 10 + 5x − 6
(a + b) = 8x + 4
Part B:
(a - b) = a(x) - b(x) # we simply subtract the two given functions
(a - b) = (3x + 10 ) - (5x − 6)
(a - b) = 3x + 10 -5x +6
(a - b) = -2x + 16
Part C:
(a * b) = a(x)*b(x)
# we simply find the product of the two given functions
(a * b) = (3x + 10)*(5x − 6)
(a * b) = [tex]15x^{2}-18x+50x-60=15x^{2}+32x-60[/tex]
Part A
The functions a(x) = 3x + 10 and b(x) = 5x − 6 to complete the function operations listed below.
(a+b)(x)=a(x)+b(x)
(a+b)(x)=(3x+10)+(5x-6)
(a+b)(x)=3x+5x+10-6
(a+b)(x)=8x+4
Part B.
(a-b)(x)=a(x)-b(x)
(a-b)(x)=(3x+10)-(5x-6)
Expand the parenthesis to get:
(a-b)(x)=3x+10-5x+6
(a-b)(x)=3x-5x+10+6
(a-b)(x)=-2x+16
Part C
(a*b)(x)=a(x)*b(x)
(a*b)(x)=(3x+10)*(5x-6)
We expand to get:
[tex]a \times b = 15 {x}^{2} - 18x + 50x - 60[/tex]
[tex]a \times b = 15 {x}^{2} + 32x - 60[/tex]
