44 years!
geez- that is the definition of a half-life ...
geez- that is the definition of a half-life ...
After one half-life, the sample will have reduced to 50% of its original value. So, if the half-life of the sample is 44 years, then after 44 years, the sample will have reduced to 50% of its original value.
In this case, you are given that the half-life of the sample is 44 years. This means that after 44 years, half of the original sample will have decayed.
To determine the time it takes for the sample to reduce to 50% of its original value, we can use the following formula:
t = n * t1/2
where:
t is the time it takes for the sample to reduce to 50% of its original value
n is the number of half-lives
t1/2 is the half-life of the sample
In this case, we want to find the time it takes for the sample to reduce to 50% of its original value, which is equivalent to one half-life.
Plugging the values into the formula:
t = 1 * 44 years
Therefore, the sample will reduce to 50% of its original value after 44 years.