use MATLAB TO SOLVE THIS PROBLEM

1. (5 points) Radioactive isotopes decay to more stable elements in an exponential process. The general equation that describes radioactive decay is: TDECAY 1 In Qo Qo = The original amount of radioactive material Q = The final amount of radioactive material TREGAX = The time in years) to decay from the original amount Qo to the final amount Q A = Decay constant of the radioactive material in question Write a MATLAB script that will perform the following steps: 1. Ask the user to enter the % of radioactive material remaining (Q/Qo) 2. Ask the user to enter the decay constant of the radioactive element (a) 3. Convert the percentage into the fraction lo 4. Calculate and display (with units) the age of the sample. To test your script, the time required for Carbon 14 to decay to 50% of its' original amount is 5729.9097 years. The Decay constant of carbon 14 = 0.00012097/year. Use two fprintf commands to create an output statement formatted to match the statement below: Given a radioactive decay constant of 0.00012097 for carbon 14, you can expect the sample to decay to 50.0 percent in 5729.9097 years