Let X be the number of jars made.
X*.32=104
X=104/.32=<<325=325>>325 jars. Answer: \boxed{325}.
X*.32=104
X=104/.32=<<325=325>>325 jars. Answer: \boxed{325}.
Let's say the factory produces X jars of peanut butter. We know that 32% of these jars are creamy peanut butter.
So, the number of creamy peanut butter jars produced is 32% of X, which can be written as 0.32X.
We are also given that the factory produced 104 jars of creamy peanut butter.
Setting up a proportion, we have:
0.32X (number of creamy peanut butter jars) = 104
To solve for X, we divide both sides of the equation by 0.32:
X = 104 / 0.32
Using a calculator or long division, we find that X is approximately 325.
Therefore, the factory produced a total of 325 jars.
Let's set up an equation to solve this problem. Let "x" represent the total number of jars produced.
The number of creamy peanut butter jars can be calculated by taking 32% (or 0.32) of the total:
0.32x = 104
To find "x," divide both sides of the equation by 0.32:
x = 104 / 0.32
Using a calculator, we find:
x ≈ 325
Therefore, the factory produced approximately 325 jars of peanut butter in total.