Answer:
-∞
As x approaches -∞, y=f(x) approaches -∞
Step-by-step explanation:
Given the function;
y = 0.5*6x
We want to determine the limit of y as x tends to minus infinity.
lim x→-∞ f(x) = lim x→-∞ y
y = f(x)
lim x→-∞ f(x) = 0.5*6(-∞)
lim x→-∞ f(x) = 3(-∞)
lim x→-∞ f(x) = -3∞ = -∞
As x tends to -∞, y=f(x) approach -3∞
But, three times minus infinity is still equal to minus infinity.
-3∞ = -∞
Therefore, As x approaches -∞, y=f(x) approach -∞
Subsitute -4y for x
-4y+6y=18
2y=18
divide both sides by 2
y=9
sub back
x=-4y
x=-4(9)
x=-36
(x,y)
(9,-36)
Answer:
0.75
Step-by-step explanation:
6/8 = 0.75
Or 8/6 = 1.3 repeating
Answer:
12 is not a solution.
Step-by-step explanation:
1. Solve for w
8w = 99
w = 99 / 8
w = 12.375
12 is not a solution.
