question 1and 2

[0, 5] (5, 10] deviations)? (10, 15] (15, 20] (20, 25] The Average Age of a Penny distribution (n = 120)? (25, 30] M= 24.3 (30, 35] relate to the underlying population mean. (35, 40] Age of Pennies (n = 121) (40, 45] (45, 50] (50, 55] (55, 60] (60, 65] o= 17.2 (65, 70] (70, 75] (75, 80] pennies and 120 pennies, respectively. (The 'youngest' penny is from 2018.) 3. What is the shape of the first population distribution (n = 121) and the 2nd population To understand statistical inference, we must first understand the behavior of sample statistics 2. What is the primary difference between these two graphs (besides the means & standard from random samples. This activity will focus on sample means, how they vary, and how they 1. Look below and review the two graphs which represent the population data for the age of 121 [0, 5] (5, 10] (10, 15] (15, 20] (20, 25] M= 23.6 (25, 30] Age of Pennies (n = 120) (30, 35] (35, 40] (40, 45] (45, 50] (50, 55] o= 16.5 (55, 60] (60, 65]