Final answer:
The chi-square distribution with 20 degrees of freedom has a population mean of 20 and a standard deviation of approximately 6.32. The correct answer is option (c), which provides these exact values.
Step-by-step explanation:
The chi-square distribution with 20 degrees of freedom will have a population mean (µ) equal to the number of degrees of freedom, and a standard deviation (σ) equal to the square root of twice the degrees of freedom. Calculating the standard deviation:
- Find the degrees of freedom (df): 20.
- Calculate the standard deviation (σ): σ = √2(df) = √2(20) = √40 ≈ 6.32.
Thus, the correct answer is (c) - the population mean is 20, and standard deviation is 6.32.