The mass of a radioactive substance decreases exponentially at a rate of 3% each day.(i) Find the overall percentage decrease at the end of 10 days

The amount of a radioactive substance decreases by 10% every 12 hours. Currently the amount of substance is 100 grams. If n is a whole number, which expression represents the number of grams of substance left n days from now? Select one:highlight_offhighlight_offhighlight_off

The mass of a particular substance is known to grow exponentially at a rate of 1.5% per day. Its initial mass was 230 grams and, after t days, it weighed 325 grams.The equation modelling this growth is.Use the method of taking logs to solve this equation for t, giving your answer correct to the nearest day.

radioactive isotope decays with a rate proportional to the original amountof material present. If originally there is 50mg of the material present and aftertwo hours it has lost 10% of its mass, determine the half-life, the time at which itis half its original mass.

A certain element decays at a constant rate of 6% per year.If you start with 20 grams of the element, how long will it take before there are only four grams left?

Instructions: Create the equation of the form y=a(b)x for the exponential function described in each real-world problem. Then, use the equation to answer the question.If there are 180180 grams of radioactive material with a half-life (decrease by half or 50%50%) of 11 hour, how much of the radioactive material will be left after 33 hours?y=𝑦= Answer 1 Question 17 (( Answer 2 Question 17 )x)𝑥What number will you fill in for x𝑥 to solve the equation? Answer 3 Question 17y=𝑦= Answer 4 Question 17CheckQuestion 17