After applying the transformation to the parent function, we will get the function f(x) = 3|x+2|
It is defined as a special type of relationship and they have a predefined domain and range according to the function every value in the domain is related to exactly one value in the range.
Let's suppose the parent function is:
f(x) = |x|
If we replace the x to x+2 the function will shift left 2 units.
f(x) = |x+2|
If we multiplied by 3 the function will be stretched by the factor 3
f(x) = 3|x+2|
If we add 4 to the function it shifted up by 2 units.
f(x) = 3|x+2|+4
Thus, after applying the transformation to the parent function, we will get the function f(x) = 3|x+2|+4
Learn more about the function here:
Answer:
I think it's 45 students
Step-by-step explanation:
B. 8 left parenthesis x plus 1.5 y right parenthesis; Mike’s hourly wage is 1.5 times Harry’s.
C. 12 left parenthesis 8 x plus y right parenthesis ; Harry’s hourly wage is 8 times Mike’s.
D. 8 left parenthesis x plus 4 y right parenthesis ; Mike’s hourly wage is 4 times Harry’s.
b. d(t) = t + 2.35; 7.35 ft
c. d(t) = ; 2.13 ft
d. d(t) = 2.35t; 11.75 ft
6 units to the left
6 units up
6 units down