Figure 3: X2 probability density function with 4 degrees of freedom, area below xeject shaded. We will next try to nd the numeric value of xgeject. 2a) [3 marks] Evaluate the integral f p($,4) dm. 0 2b) [3 marks] Use one iteration of Newton's Method to estimate a value of m such that: / p($,4) =0.95 0 The gures above are accurately depicting the position of xeject, so let's use m0 = 9.5 as our initial estimate. The updated value of m will be our approximation of xfeject. Keep the rst four digits after the decimal. 2.c) [1 mark] Is our ng3 greater or less than our estimate of xfeject? What does this mean for our eye color data