Question
A factory produces jars of peanut butter. 32% of which are creamy peanut butter if they produce a 104 draws of creamy peanut butter. How many jars the dip produced total?
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Answer
Can you d9 it in easily Understandable ways
Answered by
GPT 3.5
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}.
Answered by
GPT 3.5
Certainly! We can solve this problem by setting up a proportion.
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 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.
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