A factory produces a medicino that comes in 1 mg doses. What degree of accuracy should the scale have that the material is weighed on before it enters the pill press? (1 point)
O 1 mg
O 0.01 mg
O 0.0001 mg
O 0.1 mg
The scale should have an accuracy of 0.01 mg.
If a recipe calls for 1.25 cups of sugar, what degree of accuracy would be sufficient for the markings on Jane's 2 cup measuring device she is using?
(1 point)
O iofacup
O½ofaaup
O of acup
O yofacup
The degree of accuracy that would be sufficient for the markings on Jane's 2 cup measuring device is 1/4 of a cup.
The medication is produced in 1 mg doses. In order to maintain the desired level of accuracy, the scale should have an accuracy of 0.1 mg. Therefore, the correct answer is O 0.1 mg.
In order to determine the degree of accuracy required for the scale used to weigh the material before it enters the pill press, we need to consider the dosage requirement and the acceptable margin of error.
The factory produces a medicino that comes in 1 mg doses. This means that each pill should contain exactly 1 mg of the active ingredient.
To ensure accurate dosing, we want to minimize the margin of error as much as possible. Therefore, we should choose an accuracy level that is smaller than the desired dosage, but still practical and achievable for the manufacturing process.
Based on the options provided, we can eliminate O 1 mg and O 0.1 mg since they are the same or larger than the desired dosage.
Now we are left with two options: O 0.01 mg and O 0.0001 mg. Both options are smaller than the desired dosage of 1 mg.
The choice between 0.01 mg and 0.0001 mg depends on the acceptable margin of error in the manufacturing process. If a precision level of 0.01 mg is acceptable, it would be the choice. However, if a higher level of precision is required, 0.0001 mg would be the appropriate choice.
Without additional information about the specific requirements and constraints, it is difficult to determine the exact degree of accuracy required. Therefore, the best answer would be to choose the option that meets the acceptable level of precision for the manufacturing process and dosage requirements.