Answer
They both have the same slope.
Step by step explanation
Let's find the slope of f(x).
f(x) Xavier runs the 400m race in 50 seconds.
Slope of f(x) = 400/50 = 8
Now let's find the slope of g(x)
Let's take two points from the table and find the slope of g(x)
Let's take (3, -4) and (5, 12)
Slope of g(x) = (y2 - y1)/(x2 - x1)
Here x1 = 3, y1 = -4, x2 = 5 and y2 = 12
g(x) = (12 - (-4)) / (5 - 3)
g(x) = (12 +4) / (2)
g(x) = 16/2
g(x) = 8
The slope of g(x) = 8 and also f(x) = 8.
Therefore, the slope of both functions (f(x) and g(x)) are the same.
Answer: They both have the same slope.
Thank you. :)
Answer:
Slope of both the functions is the same.
Step-by-step explanation:
We are given two functions so we will find the slope for each of them to compare with each other.
We know that Xavier runs the 400m race in 50 seconds,
so, slope of f(x): [tex]\frac{400}{50} =8[/tex]
For finding the slope of g(x), we will take any two consecutive points and find their slope.
(5, 12) and (7, 28)
Slope of g(x) = [tex]\frac{28-12}{7-5} =\frac{16}{2} =8[/tex]
Therefore, we can conclude that slope of both of the functions, f(x) and g(x), is the same.
