Three eggs in a carton of eggs are cracked. If 25% represents the number of eggs cracked in the carton, how many eggs will the carton hold?
.25x = 3
x = 12
cap it is 9
Let's assume that the number of cracked eggs represents 25% of the total number of eggs in the carton.
If 25% represents the number of cracked eggs, then 100% - 25% = 75% represents the number of uncracked eggs.
Therefore, the number of uncracked eggs is 75% of the total number of eggs in the carton.
Let's represent the total number of eggs in the carton as "x."
So, 75% of x represents the number of uncracked eggs.
According to the information given, 75% of x are uncracked eggs, and the remaining 25% of x are cracked eggs.
Since three eggs are cracked, we can set up the equation:
25% of x = 3
To find the total number of eggs in the carton, we need to solve this equation:
0.25x = 3
Dividing both sides of the equation by 0.25:
x = 3 / 0.25
x = 12
Therefore, the carton can hold 12 eggs in total.
To determine the number of eggs in the carton, you can use the information provided.
First, let's set up an equation:
Let x be the total number of eggs in the carton.
Given that 25% of the eggs are cracked, this means that 25% of x eggs are cracked. Since three eggs in the carton are cracked, we can write the equation:
0.25x = 3
To solve for x, divide both sides of the equation by 0.25:
0.25x/0.25 = 3/0.25
Simplifying, we find:
x = 12
Therefore, the carton can hold a total of 12 eggs.