Answer:
1/64
Step-by-step explanation:
From the question given above, the following data were obtained:
Time (t) = 42.78 s
Fraction of N–16 remaining (N/N₀) =?
NOTE:
N₀ => is the original amount.
N => is the amount remaining.
Next, we shall determine the number of half-lives that has elapsed. This can be obtained as follow:
Time (t) = 42.78 s
Half-life (t½) of N–16 = 7.1 s
Number of half-lives (n) =?
n = t / t½
n = 42.78 / 7.1
n = 6
Thus, 6 half-lives has elapsed.
Finally, we shall determine the fraction of N–16 that remains undecayed. This can be obtained as follow:
Number of half-lives (n) = 6
Fraction of N–16 remaining (N/N₀) =?
N = 1/2ⁿ × N₀
N = 1/2⁶ × N₀
N = 1/64 × N₀
Divide both side by N₀
N/N₀ = 1/64
Therefore, 1/64 of the sample remains undecayed.