Initially 100 milligrams of a radioactive substance was present. After 8 hours the mass had decreased...

Initially 100 milligrams of a radioactive substance was present. After 5 hours the mass had decreased...

Initially 100 milligrams of a radioactive substance was present. After 5 hours the mass had decreased by 7%. If the rate of decay is proportional to the amount of substance present at time t, determine the half-life of the radioactive substance

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

ple 1: The mass of a radioactive substance follows a continuous exponential decay model, with a...

ple 1: The mass of a radioactive substance follows a continuous exponential decay model, with a decay rate parameter of 8.5% per day. Find the half - life of this substance (that is, the time it take for one - half of the original amount in a give sample of this substance to deca

At the beginning of an experiment, 142 grams of a radioactive chemical were present in the...

At the beginning of an experiment, 142 grams of a radioactive chemical were present in the sample of soil. After 24.5 hours, 10.5% of the quantity was gone. If the rate of decay is proportional to the amount present at time t, find the amount remaining after 48 hours.

The radioactive isotope thorium 234 has a half-life of approximately 578 hours. If a sample has...

The radioactive isotope thorium 234 has a half-life of approximately 578 hours. If a sample has an initial mass of 64 mg, a function that models the mass in mg after t hours is a(t) =   The initial mass will decay to 12 mg after ______ hours Radioactive decay equation: a(t) = a0⋅2 ^ (−t / h) a0 = starting amount a(t) = amount after t hours h = half life in hours

A radioactive substance decays at a continuous rate of 8.6% per day. After 15 days, what...

A radioactive substance decays at a continuous rate of 8.6% per day. After 15 days, what amount of the substance will be left if you started with 100 mg? (a) First write the rate of decay in decimal form. r= (b) Now calculate the remaining amount of the substance. Round your answer to two decimal places

Part A You are using a Geiger counter to measure the activity of a radioactive substance...

Part A You are using a Geiger counter to measure the activity of a radioactive substance over the course of several minutes. If the reading of 400. counts has diminished to 100. counts after 78.4 minutes , what is the half-life of this substance? Express your answer with the appropriate units. Part B An unknown radioactive substance has a half-life of 3.20 hours . If 26.8 g of the substance is currently present, what mass A0 was present 8.00 hours...

How many milligrams of radioactive iodine (I-131) would be left from an initial amount of 100...

How many milligrams of radioactive iodine (I-131) would be left from an initial amount of 100 mg after 32 days if the half life is 8 days?

Phosphorus-32 (P-32) has a half-life of 14.2 days. If 450 g of this substance are present...

Phosphorus-32 (P-32) has a half-life of 14.2 days. If 450 g of this substance are present initially, find the amount Q(t) present after t days. (Round your growth constant to four decimal places.) Q(t) = What amount will be left after 17.6 days? (Round your answer to three decimal places.)

A sample initially contains 200 grams of a certain radioactive isotope. After 5 hours, the amount...

A sample initially contains 200 grams of a certain radioactive isotope. After 5 hours, the amount has decayed to 177 grams. Let A(t) denote the amount (in grams) of the isotope after t hours. Assume that A ( t ) = C e ^(k t ) for some constants C and k. At what rate is the isotope decaying (in grams per hour) when t=6? Hint: use a derivative.