Answer:
B. [tex] y = 65x [/tex]
Step-by-step explanation:
Equation showing a proportional relationship between two quantities, is usually written as [tex] y = kx [/tex]. Where,
y = output/dependent variable
x = input/independent variable
k = constant of proportionality that exists between each pair of values given.
In this case:
y = trees planted
x = time (weeks)
To find the constant of proportionality, k, use any given pair as (x, y). Let's use (10, 650).
Substitute y = 650 and x = 10 into [tex] y = kx [/tex], and solve for the value of k.
[tex] 650 = k(10) [/tex]
Divide both sides by 10
[tex] \frac{650}{10} = k [/tex]
[tex] 65 = k [/tex]
[tex] k = 65 [/tex]
Substitute k = 65 into [tex] y = kx [/tex] to generate the equation that shows the proportional relationship in the table:
[tex] y = 65x [/tex]
