The amount of money the father gives his son each day doubles from the previous day.
On day 1, the father gives:
- Day 1: \(0.01 = 2^0 \times 0.01\)
On day 2, the father gives:
- Day 2: \(0.02 = 2^1 \times 0.01\)
On day 3, the father gives:
- Day 3: \(0.04 = 2^2 \times 0.01\)
Continuing this pattern, on day \(n\), the amount given is:
- Day \(n\): \(0.01 \times 2^{(n-1)}\)
For day 14: \[ \text{Amount on day 14} = 0.01 \times 2^{(14-1)} = 0.01 \times 2^{13} \]
Calculating \(2^{13}\): \[ 2^{13} = 8192 \]
So, \[ \text{Amount on day 14} = 0.01 \times 8192 = 81.92 \]
Thus, the father gives his son $81.92 on day 14.
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