Dr. Norton wants to find the half-life of a medication for his patients. He tried to rewrite the function Q(t)=100⋅44−t in the form Q(t)=Q0(12)th, where t is measured in hours, but he got stuck. His work is shown here. Step 1 Q(t)=100⋅44−t Step 2 Q(t)=100⋅44⋅4−1 Step 3 Q(t)=25600⋅(14)t Step 4 Q(t)=25600⋅(14)h(th) Step 5 Q(t)=25600⋅((14)h)(th) A: If (14)h=12, what is the value of h to the nearest hundredth? Use this tool for calculating h to help you. B: Which option correctly shows Dr. Norton's function in the form Q(t)=Q0(12)th? Select one answer for question A and one answer for question B. A: h≈2.01 B: Q(t)=25600⋅(12)t2 B: Q(t)=25600⋅(12)t2.01 B: Q(t)=25600⋅(12)t0.49 A: h=0.50 A: h=2.00 B: Q(t)=25600⋅(12)t0.50 A: h≈0.49