What is the half-life of Radium 226?
Exponential Functions and Radioactive Decay
Interactive Video
•
Mathematics, Physics, Chemistry, Science
•
9th - 12th Grade
•
Hard
Amelia Wright
FREE Resource
The video tutorial explains the concept of half-life using radium 226, which has a half-life of 1,590 years. It discusses two exponential decay functions, highlighting their differences and how to choose between them. The tutorial models the decay of radium 226 using an exponential function and calculates the remaining amount after 2,500 years, demonstrating the process with a calculator. The tutorial emphasizes that either function could be used to achieve the same result, though one may require more work.
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10 questions
Show all answers
1.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
1,590 years
2,500 years
1,000 years
3,000 years
2.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
Which of the following is NOT a component of the first exponential function discussed?
Initial amount 'A'
Decay rate 'R'
Continuous decay rate 'K'
Time 'T'
3.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
In the second exponential function, what does 'K' represent?
Time
Continuous decay rate
Decay rate per unit time
Initial amount
4.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
What is the main difference between the two exponential functions discussed?
One is for growth, the other for decay
One is simpler to use
One is more accurate than the other
One uses a continuous decay rate, the other does not
5.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
What is the purpose of dividing 'T' by 1,590 in the exponential function?
To ensure the exponent equals one at half-life
To adjust the decay rate
To calculate the initial amount
To convert time to seconds
6.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
How much of the 100 milligrams of Radium 226 remains after 2,500 years?
33.6 milligrams
10 milligrams
25 milligrams
50 milligrams
7.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
What is the initial amount 'A' used in the calculation?
200 milligrams
100 milligrams
150 milligrams
50 milligrams
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