Winifred, being the precocious child she is, realized there was a pattern when computing smaller sums of odd numbers.

First 3: 1 + 3 + 5 = 9
First 4: 1 + 3 + 5 + 7 = 16
First 5: 1 + 3 + 5 + 7 + 9 = 25

Do you see the pattern like our dear friend Winnie?

For the first n odd numbers, the sum is equal to n². Thus the first 50 is 50², or 2,500, and the first 75 is 75², or 5,625.

Knowing kerosene and water wouldn’t mix and kerosene is less dense than water, he dipped the lamp in the lake and filled it with enough water so the kerosene rose to the top to cover the wick. The lamp was still burning an hour later when a motorboat rescued him.

I hesitated to add this because it’s poorly worded, ambiguous and the answer could be almost anything. I prefer teasers with a single answer, but there you go.

If you came up with a different answer and can explain how you did it, don’t think you’re wrong. It’s probably just as valid. Feel free to share yours in the comments.

My answer for the first number is 2.

Here’s how I got it.

The generic rule for a number in the sequence is: 2^{^(n – 1)} + 1, where n is the position in the sequence.

Note: The teaser doesn’t specify the position of 17. In this case, it’s fifth.

Position 1: (so n = 1) is 2^{^(1 – 1)} + 1 = 2

Position 2: 2^{^(2 – 1)} + 1 = 3

Position 3: 2^{^(3 – 1)} + 1 = 5

Position 4: 2^{^(4 – 1)} + 1 = 9

Position 5: 2^{^(5 – 1)} + 1 = 17

For the curious, the next 5 numbers of the sequence would be:

Position 6: 2^{^(6 – 1)} + 1 = 33

Position 7: 2^{^(7 – 1)} + 1 = 65

Position 8: 2^{^(8 – 1)} + 1 = 129

Position 9: 2^{^(9 – 1)} + 1 = 257

Position 10: 2^{^(10 – 1)} + 1 = 513