MATH-175 Midterm: MATH 175 Boise State Exam2 shortAsp17

2n: (10 points) order these sequences in the blanks below, based on their speed to in nity. N3 + n n n3 + n, n: (15 points) consider the sequence an = n! 12(n + 1) (a) graph the sequence from n = 0 to n = 5 on the grid below. Include axes and proper labels. (b) on your graph, draw and shade rectangles that correctly represent. Xn=2 an: (12 points) identify each of the following series as being convergent or divergent. Divergent: (10 points) suppose f (x) is a function with these features: f (2) = 5, f (2) = 3, f (2) = 0, f (3)(2) = 8, f (4)(2) = 6. Find the fourth degree taylor polynomial approximation of f (x), centered at x = 2. Your result must be written in standard form with fully simpli ed coe cients: (8 points) consider this cubic taylor polynomial, centered at x = 1: