Consider the autonomous first-order differential equation y′=y(2−y)(4−y)y′=y(2−y)(4−y) Find the DISTINCT critical points and classify each as (1) AS for Asymptotically Stable, (2) US for Unstable or (3) SS for Semi-Stable. Enter your answer as a comma separated list of pairs consisting on a critical point and its stability type (e. g. your answer might look like (2,AS), (-3,SS), (7,US) ) Critical Point and Stability: For the initial value problem y′=y(2−y)(4−y), y(0)=3y′=y(2−y)(4−y), y(0)=3 we have limx→[infinity]y(x)=limx→[infinity] y(x)= .