Final answer:
The interval that contains approximately 95% of the molds' weights filled by the machine is 1106 to 1194 pounds, following the empirical rule for a normal distribution, which corresponds to option b) of the choices provided.
Step-by-step explanation:
The weight of the concrete poured into a mold by a machine follows a normal distribution with a mean of 1150 pounds and a standard deviation of 22 pounds. To find the interval that contains approximately 95% of the molds filled by this machine, we need to use the empirical rule which states that about 95% of the data in a normal distribution falls within ±2 standard deviations of the mean.
To calculate the interval:
- Start with the mean: 1150 pounds.
- Calculate the lower limit by subtracting 2 standard deviations from the mean: 1150 - (2 × 22) = 1150 - 44 = 1106 pounds.
- Calculate the upper limit by adding 2 standard deviations to the mean: 1150 + (2 × 22) = 1150 + 44 = 1194 pounds.
Therefore, approximately 95% of the molds filled by this machine will hold weights in the interval 1106 to 1194 pounds.
The correct answer is option b) 1106 to 1194 pounds.