Use integration by parts to express the definite integral I, = "x"e* dx in terms of In-1=x"-le dx. Apply this reduction formula to compute 13. 4. Classify the following series as absolutely convergent, conditionally convergent, or divergent: 80 11 Σ 11 Vigủ 1 (-1)" Σ n=1 √n²+1 (-2)" n! 5. (i) Use the Leibniz test to show that the series 1 (-1)"+1 √n 1 1 1 √2 √√3 √4 √5 converges. (ii) Use your calculator (the built-in sum command for a sequence) to find the partial sum $100 of the above series. How far is the estimate $100 from the actual sum s? 6. Find the interval of convergence of the power series 3" (x + 1)" 11 n=1 7. Use Taylor series to find lim 1+x³-e 26 8. Write the 2nd degree Taylor polynomial T₂(x) for the function f(x) = √√x at the point a = 8. Then find the approximate value of 10 by computing T₂(10). Estimate the error in your approximation using Taylor's formula for the remainder term R₂(x). IM² IM² Σ #=1