Michael bought a shirt on a 25% discount. If he paid only 339 pesos, what is the original price of the shirt?

(1-.25)x = 339

Solve for x.

p = 339 / (1 - .25)

Well, it seems Michael found a fashion steal! To find the original price of the shirt, we can use a little math magic. If he paid 339 pesos, which is 75% of the original price, we can set up an equation. Let's call the original price "P" pesos. 75% of P is equal to 339, so we can write it as 0.75P = 339. Now, let's solve for P: P = 339 / 0.75. Grabbing my calculator... *beep boop beep* Ah! The original price of the shirt is 452 pesos! Michael got some serious savings there!

To find the original price of the shirt, we can use the following formula:

Original price - (Original price * Discount percentage) = Sale price

Let's represent the original price as "x" and the discount percentage as 25%.

Therefore, the equation becomes:

x - (x * 0.25) = 339 pesos

To solve for x, we can follow the steps:

1. Distribute 0.25 to x:

x - 0.25x = 339 pesos

2. Combine like terms:

0.75x = 339 pesos

3. Divide both sides by 0.75:

x = 339 pesos / 0.75

By dividing:

x = 452 pesos

Therefore, the original price of the shirt was 452 pesos.

To find the original price of the shirt, we can use the concept of finding a percentage of a number.

Let's denote the original price of the shirt as "x" pesos. Since Michael bought the shirt with a 25% discount, he paid 75% of the original price.

To calculate this, we can set up the following equation:

(75/100) * x = 339

To solve for x, we can isolate it by dividing both sides of the equation by (75/100):

x = 339 / (75/100)

To simplify, we can multiply the numerator and denominator by 100:

x = 339 * (100/75)

Now, let's perform the calculation:

x = 452

Therefore, the original price of the shirt was 452 pesos.