Could someone please explain how to do these two problems? They are extremely li
ID: 3341777 • Letter: C
Question
Could someone please explain how to do these two problems? They are extremely likely to be on my midterm tomorrow and I would greatly appreciate it if someone could explain how to do them!
4. Radium goes through radioactive decay, with a half-life of 1599 years. What percent of a present amount of radioactive radium will remain after 900 years? [Hint: You do not need to know what the initial amount is.]
5. Find the equation of the function f whose derivative is f'(x) = 6sqrt(x)-10 and whose graph passes through the point (4,2).
Explanation / Answer
4.
If N be the amount at time t and N0 be the initial amount, we have,
dN/dt = -kN where k is some positive constant called decay consatnt.
This gives, dN/N = -k dt
Integrating both the sides we get, ln N = -kt + C
At t = t_half, we have N = N0/2
Thus, ln N0/2 = -k*t_half + C
C = ln N0/2 + k*t_half
Thus, ln N = -kt + ln N0/2 + k*t_half...................1
At t= 0 we have N = N0
Thus, ln N0 = 0 + ln N0/2 + k*t_half
ln (N0 / (N0/2)) = k*t_half
ln 2 = k*t_half
k = (ln 2) / t_half
Thus, k = (ln 2) / 1599
Using eqn 1, ln N = ln (N0/2) + k(t_half - t)
ln (N/(N0/2)) = ((ln 2) / 1599) *(1599 - 900) = 0.303
2N/N0 = exp 0.303 = 1.354
N/N0 = 0.677 or 67.7 %.
Hence, after 900 years, 67.7 % will remain.
5.
f'(x) = 6 sqrt x - 10
Let y = f(x)
So, dy/dx = f'(x)
So, dy/dx = 6 sqrt x - 10
Integrating both the sides, y = 6*(1/2 + 1)*x^(1/2 + 1) + 10x + C
y = 6*(x^1.5)/1.5 + 10x + C
y = 4*x^1.5 + 10x + C.............1
As curve passes through (4,2) we get
2 = 4*4^1.5 + 10*4 + C
C = -70
Thus, from eqn 1 we get that
y = 4*x^1.5 + 10x - 70
Thus, f(x) = 4*x^1.5 + 10x - 70