Final answer:
To predict the period of a 7-foot pendulum using the least-squares regression line, log(Time) = 0.699 + 0.500 log(Length), the length must be converted to meters and substituted into the equation. None of the provided answer choices match the calculated period of approximately 7.3 seconds, indicating a possible error in the question or calculation.
Step-by-step explanation:
To find how many seconds this model predicts a 7-foot pendulum would take to complete one period, we first need to understand the least-squares regression line given: log Time = 0.699 + 0.500 log(Length). Since we want to find the time for a pendulum of length 7 feet,
we convert 7 feet to meters (since pendulum length in physics equations is typically measured in meters) which is about 2.1336 meters. Using the logarithmic model, we calculate log Time = 0.699 + 0.500 log(2.1336).
Step 1: Calculate log(2.1336) ≈ 0.3293
Step 2: Substitute into the equation: log Time = 0.699 + 0.500 × 0.3293 = 0.699 + 0.1647 = 0.8637
Step 3: Find the Time by taking the antilog (10^x) of 0.8637, which gives us the time in seconds: Time ≈ 10^0.8637 ≈ 7.3 seconds.
However, none of the given options match this result. Given the options a. 1.1 seconds, b. 3.1 seconds, c. 4.2 seconds, d. 13.2 seconds, it seems there might be an error either in the question or the calculation. It is likely that additional context or a review of the question is required.