strontium 90 is a radioactive material that decays according to the function A(t)=Aoe^0.0244t ,where So is...

The half-life of radioactive strontium-90 is 29 years. In 1960, radioactive strontium-90 was released into the...

The half-life of radioactive strontium-90 is 29 years. In 1960, radioactive strontium-90 was released into the atmosphere during testing of nuclear weapons, and was absorbed into people's bones. a. Write down a function describing the amount of strontium-90 left in a person's bones, t years after the 1960 nuclear test. b. In what year will only 10% of the original amount absorbed by a person remains?

The half-life of radioactive strontium-90 is approximately 30 years. In 1961, radioactive strontium-90 was released into...

The half-life of radioactive strontium-90 is approximately 30 years. In 1961, radioactive strontium-90 was released into the atmosphere during testing of nuclear weapons, and was absorbed into people's bones. How many years does it take until only 8 percent of the original amount absorbed remains? time = _______ years

A radioactive material disintegrates at a rate proportional to the amount currently present. If Q(t) is...

A radioactive material disintegrates at a rate proportional to the amount currently present. If Q(t) is the amount present at time t, then dQ/dt =−rQ where r>0 is the decay rate. If 100 mg of a mystery substance decays to 81.14 mg in 4 weeks, find the time required for the substance to decay to one-half its original amount. Round the answer to 3 decimal places. ______________weeks

A sample of a certain radioactive material decays to 89.36% of its mass after 2 years....

A sample of a certain radioactive material decays to 89.36% of its mass after 2 years. a. What is the half-life of the material? Show your calculations and keep four significant figures of accuracy. b. How long would it take for the sample to decay to 10% of its original mass? How much longer after that would it take to decay to 1% of its original mass?

An accident at a nuclear power plant has left the surrounding area polluted with radioactive material...

An accident at a nuclear power plant has left the surrounding area polluted with radioactive material that decays naturally. The initial amount of radioactive material present is 48 su(safe units), and 5 months later it is still 28 su, (a) Write a formula giving the amount A(t) of radioactive material (in su) remaining after t months. (b) What amount of radioactive material will remain after 8 months? (c) How long will it be until A=1 su, so it is safe...

After 45 years, 35 % of a radioactive material decays. What is the half-life?

After 45 years, 35 % of a radioactive material decays. What is the half-life?

Q.1 Radioactive 68Ge decays by β+ with a 271 day half-life. How many grams of an...

Q.1 Radioactive 68Ge decays by β+ with a 271 day half-life. How many grams of an initial 2.50 g sample of 68Ge remain after 365 days of radioactive decay? Q.2 A particular reaction has an initial concentration of 4.302 M and a final concentration of 3.978 M after 1.08 seconds. The rate constant is 0.0175 M-1s-1. What is the half-life at the initial concentration?

A nuclear power plant that was started in 1971 produces p (t) = 1 + αt...

A nuclear power plant that was started in 1971 produces p (t) = 1 + αt kg Strontium-90 per year where t is the number of years since its inception. How much Strontium-90 produced from the start was left in 1992? Radioactive decay is described by n (t) = n0e^ (−kt), the half-life of Strontium-90 is 28 years and α = 1/10.

An exponential decay function can be used to model the number of grams of a radioactive...

An exponential decay function can be used to model the number of grams of a radioactive material that remain after a period of time.​ Carbon-14 decays over​ time, with the amount remaining after t years given by y=y 0 e Superscript negative 0.00012378 ty=y0e−0.00012378t​, where y0 is the original amount. If the original amount of​ carbon-14 is 450450 grams, find the number of years until 346346 grams of​ carbon-14 remain.

Strontium-90 (90Sr) is a radioactive isotope with a half-life of 28.8 years. What percentage of this...

Strontium-90 (90Sr) is a radioactive isotope with a half-life of 28.8 years. What percentage of this isotope remains after 11.4 years?