kendra bought a gallon of milk and $\\frac{5}{6}$ of a pound of oranges. if the gallon of milk cost…

kendra bought a gallon of milk and $\\frac{5}{6}$ 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?\n\n$3.60 + \\frac{5}{6}x = 4.35$\n$4.35 + \\frac{5}{6}x = 3.60$\n$3.60x + \\frac{5}{6} = 4.35$\n$4.35x + \\frac{5}{6} = 3.60$

kendra bought a gallon of milk and $\\frac{5}{6}$ 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?\n\n$3.60 + \\frac{5}{6}x = 4.35$\n$4.35 + \\frac{5}{6}x = 3.60$\n$3.60x + \\frac{5}{6} = 4.35$\n$4.35x + \\frac{5}{6} = 3.60$

Answer

Explanation:

Step1: Identify the fixed cost

The cost of one gallon of milk is a constant value. $$3.60$$

Step2: Express the variable cost

The cost of oranges depends on the weight and price per pound $x$. $$\frac{5}{6}x$$

Step3: Formulate the total cost equation

The sum of the milk and orange costs equals the total spent. $$3.60 + \frac{5}{6}x = 4.35$$

Answer:

$3.60 + \frac{5}{6}x = 4.35$