Step-by-step explanation:
The given system of equations is
(4/5)x + 6y = 15
-x + 18y = 11
To solve the system, we will use the substitution method, so first, we need to solve the second equation for x
-x + 18y = 11
-x + 18y - 18y = 11 - 18y
-x = 11 - 18y
-x(-1) = 11(-1) - 18y(-1)
x = -11 + 18y
Now, we can replace x = -11 + 18y on the first equation
(4/5)x + 6y = 15
(4/5)(-11 + 18y) + 6y = 15
(4/5)(-11) + (4/5)(18y) + 6y = 15
-8.8 + 14.4y + 6y = 15
-8.8 + 20.4y = 15
Then, solve the equation for y
-8.8 + 20.4y + 8.8 = 15 + 8.8
20.4y = 23.8
20.4y/20.4 = 23.8/20.4
y = 7/6
Finally, we can find the value of x as follows
x = -11 + 18y
x = -11 + 18(7/6)
x = -11 + 21
x = 10
So, the solution to the system is x = 10 and y = 7/6