A store is having its year-end sale. A shirt now costs $7.98, which is half of its original price. Complete and solve the working equation that represent the original price, p, of the shirt.
__p = 7.98
p= 15.96
The first one is not 2
Let's represent the original price of the shirt as p.
According to the problem, the current price of the shirt is $7.98, which is half of its original price. We can represent this information in an equation:
7.98 = p/2
To find the original price, we can multiply both sides of the equation by 2:
2(7.98) = p
15.96 = p
Therefore, the original price of the shirt is $15.96.
To find the original price of the shirt, we can set up the following equation:
p = 2 * 7.98
Multiplying the discount price by 2 will give us the original price.
Solving the equation:
p = 2 * 7.98
p = 15.96
Therefore, the original price of the shirt was $15.96.
To solve this problem, we need to set up an equation that represents the relationship between the current price of the shirt and its original price.
Let's assume that the original price of the shirt is represented by variable "p". We are given that the current price of the shirt is half of its original price, which is $7.98.
So, we can set up the equation as follows:
p/2 = 7.98
To solve for "p", we can multiply both sides of the equation by 2 to eliminate the fraction:
p = 2 * 7.98
p = 15.96
Hence, the original price of the shirt is $15.96.