The patient’s order reads 141 mu per ks of weight. The patient weigh 186 pound. How many wems of enedication we to be given to the patient? Round your answer to the nearest tenth
The Correct Answer and Explanation is :
To calculate how many “wems” (I assume this is a medication unit) need to be given to the patient, we follow these steps:
Step 1: Convert weight from pounds to kilograms
The patient’s weight is 186 pounds. To convert pounds to kilograms, we use the conversion factor:
[
1 \, \text{pound} = 0.453592 \, \text{kg}
]
Thus, the patient’s weight in kilograms is:
[
186 \, \text{pounds} \times 0.453592 \, \frac{\text{kg}}{\text{pound}} = 84.373 \, \text{kg}
]
Step 2: Calculate the total medication dose
The medication order is 141 mu per kilogram of weight. To calculate the dose, we multiply the patient’s weight in kilograms by the medication dosage in mu:
[
141 \, \text{mu} \times 84.373 \, \text{kg} = 11,888.493 \, \text{mu}
]
Step 3: Round the result
We are asked to round the answer to the nearest tenth, so:
[
11,888.493 \, \text{mu} \approx 11,888.5 \, \text{mu}
]
Final Answer:
The total dose of medication to be given to the patient is 11,888.5 mu.
Explanation:
This calculation follows standard pharmacokinetic principles where dosage calculations are based on the patient’s weight. Medications are often dosed per unit of body weight, commonly in milligrams (mg) per kilogram (kg) or in this case, “mu” per kilogram.
The process involves converting weight from pounds (a more common unit in the US) to kilograms (a more commonly used unit in medical dosing). After the conversion, the appropriate dose per kilogram is multiplied by the patient’s weight in kilograms to find the total dose of medication. This ensures that the correct amount is administered based on the individual’s body weight.
Rounding to the nearest tenth is a common practice to avoid precision issues in clinical settings, as medications are typically administered in whole or decimally rounded doses for ease and accuracy.