Joe spends $8.00 on lunch and $6.50 on dry cleaning. He also buys 2 shirts that each cost the same amount. Joe spends a total amount of $52.00. What is the cost of each shirt?

answer 18.75

(52)-(8)-(6.50)=37.50

37.50 (divided) 2 =18.75
this is the answer trust me

If each shirt cost $x, then

8.00 + 6.50 + 2x = 52.00
Now just solve for x

ANYONE THERE??

Actually, if we can identify the perpendicularity, we can essentially see the physicality and rigorousness required to construct a powerful and proper solution that will satisfy the problem requirements. first, we need to construct an equilibrium and cancel out unnecessary factors. This problem is Quintessential of how we can use the Morgy Theorem to solve the problem.

Let's assume the cost of each shirt is "x" dollars.

We know that Joe spends $8.00 on lunch and $6.50 on dry cleaning, which adds up to $14.50. We also know that he buys 2 shirts, so the total cost of the shirts is 2x dollars.

Joe's total expense is $52.00, therefore we can set up the equation:
14.50 + 2x = 52.00

To find the cost of each shirt, we need to solve this equation for x.

First, let's isolate the term with "x" by subtracting 14.50 from both sides of the equation:
2x = 52.00 - 14.50
2x = 37.50

Next, we need to isolate "x" by dividing both sides of the equation by 2:
x = 37.50 / 2
x = 18.75

Therefore, each shirt costs $18.75.