Given x₁ and x₂ distributions that are normal or approximately normal with unknown σ₁ and σ₂, the value of t corresponding to x₁ − x₂ has a distribution that is approximated by a Student's t distribution. We use the convention that the degrees of freedom is approximately the smaller of n₁ − 1 and n₂ − 1. However, a more accurate estimate for the appropriate degrees of freedom is given by Satterthwaite's formula:

d.f. ≈ 

s12 n1  +  s22 n2   2

1 n1 − 1 s12 n1   2    +  1 n2 − 1 s22 n2   2

 

where s₁, s₂, n₁, and n₂ are the respective sample standard deviations and sample sizes of independent random samples from the x₁ and x₂ distributions. This is the approximation used by most statistical software. When both n₁ and n₂ are 5 or larger, it is quite accurate. The degrees of freedom computed from this formula are either truncated or not rounded.

(a) We tested whether the population average crime rate μ₂ in the Rocky Mountain region is higher than that in New England, μ₁. The data were n₁ = 19, x₁ ≈ 3.51, s₁ ≈ 0.82, n₂ = 12, x₂ ≈ 3.87, and s₂ ≈ 1.09. Use Satterthwaite's formula to compute the degrees of freedom for the Student's t distribution. (Round your answer to two decimal places.)
d.f. =