Kendra bought a gallon of milk and 5/6 of a pound of oranges. If the gallon of milk cost $3.60 and she spent a total of $4.35, which equation can be used to determine x, the cost of a pound of oranges?
(5/6)x + 3.60 = 4.35
(5/6)x + 3.60 = 4.35
To determine the cost of a pound of oranges, let's use the equation:
(5/6) * x + 3.60 = 4.35
Explanation:
We know that Kendra spent $4.35 in total, which includes the cost of the gallon of milk (which is $3.60) and the cost of the oranges (represented by 'x').
The weight of the oranges is given as 5/6 of a pound (which is equivalent to 5/6 * x, where 'x' is the cost of a pound of oranges).
By adding the cost of the gallon of milk and the cost of the oranges, we get the total amount Kendra spent, which is $4.35.
Simplifying the equation:
(5/6) * x + 3.60 = 4.35
Multiply 5/6 with x:
(5/6) * x = 4.35 - 3.60
(5/6) * x = 0.75
Now, to solve for 'x', we multiply both sides of the equation by 6/5 to isolate 'x':
x = (6/5) * 0.75
x = 0.9
Therefore, the cost of a pound of oranges (represented by 'x') is $0.90.
Kendra bought a gallon of milk and mc013-1.jpg of a pound of oranges. If the gallon of milk cost $3.60 and she spent a total of $4.35, which equation can be used to determine x, the cost of a pound of oranges?
mc013-2.jpg
mc013-3.jpg
mc013-4.jpg
mc013-5.jpg