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A scientist begins with 250 grams of a radioactive substance. After 250 minutes, the sample has...
Modeling Exponential Growth and Decay A scientist begins with 240 grams of a radioactive substance. After 250 minutes, the sample has decayed to 34 grams. a. Rounding to four decimal places, write an exponential equation, R(t) = Aekt, representing this situation, using the variablet for minutes. R(O) = b. To the nearest minute, what is the half-life of this substance? The half-life is approximately minutes.
At the beginning of an experiment, a scientist has 348 grams of radioactive goo. After 195 minutes, her sample has decayed to 43.5 grams. What is the half-life of the goo in minutes? Find a formula for G(t), the amount of goo remaining at time t. G(t) How many grams of 800 will remain after 77 minutes? You may enter the exact value or round to 2 decimal places
At the beginning of an experiment, a scientist has 368 grams of radioactive goo. After 210 minutes, her sample has decayed to 46 grams. What is the half-life of the goo in minutes? Find a formula for G(t), the amount of goo remaining at time t. G(t) = How many grams of goo will remain after 41 minutes? You may enter the exact value or round to 2 decimal places. Question Help: Video
At the beginning of an experiment, a scientist has 108 grams of radioactive goo. After 240 minutes, her sample has decayed to 3.375 grams. What is the half-life of the goo in minutes? Preview How many grams of goo will remain after 99 minutes? Preview How many grams of goo will remain after 218 minutes? Preview Round your answers to the nearest tenth as needed. Get help: Video Drintendent
A radioactive substance decays at a rate proportional to the amount present at ime t (in hours). Initially, Ao grams of the substance was present, and after 10 hours, the mount has decreased by 20% How long will it take the substance to decay to 40? hat is the half life of this substance? Hint: the half-life is the time required for half of the initial substance to decay)
Radioactive substance decays so that after t years, the amount remaining, expressed as a percent of the original amount, is A(t)=100(1.6)^(-t). a) Determine the function A’, which represent the rate of decay of the substance. b) what is the half-life for this substance? c) what is the rate of decay when half the substance has decayed?
How long will it take a sample of radioactive substance to decay to half of its original amount, if it decays according to the function A(t) = 250e - 223, where t is the time in years? Round your answer to the nearest hundredth year. A) 3.11 yr B) 55.75 yr 24.76 yr D) 27.87 yr
A radioactive substance has a decay rate of 0.064 per minute. How many grams of a 150 gram sample will remain radioactive after 45 minutes? Round the answer to the nearest tenth of a gram, and do not include the unit in your answer. Sorry, that's incorrect. Try again? 147.1
Question 4 a) A radioactive substance has a half-life of 30 minutes. What fraction of the atoms will not have decayed after 1 hour? Use the graphical method (sketch nuclei remaining – time graph) to answer this question. b) A 0.25-kg radon-226 emits alpha particles at a measured rate of 9.0 × 10^12 s^-1. What is the decay constant of radium? (No of Ra atoms in a mole = 6.0 × 10^23)
After 20 years a quantity of a radioactive substance has decayed to 60 grams, and at the end of 50 years to 40 grams. How many grams were there in the first place?