Mr. Gonzales has only $36 to spend at a clothing store. He wants to buy a shirt that costs $22 and some bracelets that cost $3.50 each. Choose which equation will determine x, the maximum number of bracelets Mr. Gonzales could buy. (1 point) Responses 22x+3.50=36 22x+3.50=36 3.50x+22=36 3.50x+22=36 x+22=36 x+22=36 3.50x+22=36
The equation that will determine x, the maximum number of bracelets Mr. Gonzales could buy, is:
3.50x + 22 = 36
solve the equation for the equation to determine number of braclets
To solve the equation 3.50x + 22 = 36 for x, we need to isolate x on one side of the equation.
First, we can start by subtracting 22 from both sides of the equation:
3.50x + 22 - 22 = 36 - 22
This simplifies to:
3.50x = 14
Next, we divide both sides of the equation by 3.50 to solve for x:
(3.50x) / 3.50 = 14 / 3.50
This simplifies to:
x = 4
Therefore, the maximum number of bracelets Mr. Gonzales could buy is 4.
To determine the maximum number of bracelets Mr. Gonzales could buy within his budget, we can create an equation by considering the total cost of the shirt and bracelets:
Let x represent the number of bracelets Mr. Gonzales buys.
Since each bracelet costs $3.50, the total cost of the bracelets would be 3.50x.
The cost of the shirt is $22.
The total cost Mr. Gonzales can spend is $36.
To find the equation, we need to add the cost of the shirt and bracelets and set it equal to the total amount Mr. Gonzales can spend:
22 + 3.50x = 36
The correct equation that determines x, the maximum number of bracelets Mr. Gonzales could buy, is:
3.50x + 22 = 36