An initial amount of 100 g of the radioactive isotope thorium-234 decays according to Q(t) =...
Please show your steps clearly. . The radioactive isotope Uranium-234 decays to Thoriu-230 with a half-life of T. Thorium 230 itself is also radioactive and decays to Radium-226 with a half-life of γ and γ > τ Although Radium-226 is also radioactive its half-life is much longer than T and γ and here we assume that it is relative stable. Consider the scenario when we start with a certain amount of pure Uranium-234, because of this chain of decays, we...
The radioactive isotope thorium 234 has a half-life of approximately 578 hours. (a) If a sample has a mass of 67 milligrams, find an expression for the mass after t hours. Q(t) = 67e-0.0011997 (b) How much will remain after 85 hours? (Round your answer to one decimal place.) 60.5 mg (c) When will the initial mass decay to 20 milligrams? (Round your answer to one decimal place.) 1008.3 x hr
A sample of 400g of radioactive lead-210 decays to polonium-210 according to the function A(t)=400e−0.032t, where t is time in years. Find the amount of radioactive lead remaining after (a) 4 yr, (b) 6 yr, (c) 15yr. (d) Find the half-life.
lt 23) In the formula A)Aekt, A is the amount of radioactive material remaining from an initial amount Ao at a given time t, and k is a negative constant determined by the nature of the material. A certain radi isotope decays at a rate of 03% annually Determine the half-life of this isotope, to the nearest year A)231 yr B)100 yr C)167 yr D)2yr
A radioactive element decays according to the function y=y0 e −0.0307t, where t is the time in years. If an initial sample contains y0 = 8 grams of the element, how many grams will be present after 20 years? What is the half-life of this element?
Find the half-life of a radioactive element, which decays according to the function A(t)=A0e−0.0372t, where t is the time in years.
A 0.0116-g sample of a radioactive isotope with a half life of 1.3x109 years decays at the rate of 2.9x104 disintegrations per minute. Calculate the molar mass of the isotope. Enter your answer in scientific notation. (g/mol)
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)
23) In the formula A(O)- Agekt, A is the amount of radioactive material remaining from an initial am a given time t, and k is to e decays at a rate of 0.3% annually. Determine hehalf ife of this isotope, to the nearest year is a negative constant determined by the nature of the material. A certain radioactive A) 231 yr B) 100 yr C) 167 y D) 2yr 24) The half-life of an element is 5.0 x і012 yr....
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?