Final answer:
The probability of getting 5 heads from 5 coin flips, assuming the coin is fair, is calculated by multiplying the probability of getting a head on a single flip (½) five times, resulting in the answer 1/32, which corresponds to choice D.
Step-by-step explanation:
The question is about calculating the probability of a specific outcome when flipping a coin multiple times, a common topic in high school mathematics, specifically in the field of probability theory. The outcome in question is getting 5 heads from 5 coin flips.
To solve the mathematical problem completely, we acknowledge that the chance of getting a head on a single coin flip is 0.5 (or ½), as each flip is independent. Therefore, for each coin flip to come up heads, the individual probabilities must be multiplied together. As such, the probability of obtaining 5 heads in 5 consecutive coin flips would be:
(½) × (½) × (½) × (½) × (½) = ½⁵ = 1/32.
Hence, the correct option for the probability of obtaining 5 heads from 5 coin flips is D) 1/32.