Question 1210530
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The problem has no solution.<br>
The exterior angle of Grogg's equilateral polygon has measure {{{360/g}}} degrees.<br>
That exterior angle has a measure equal to 6 times the measure of each interior angle of Winnie's polygon, so the measure of each interior angle of Winnie's polygon is {{{(360/g)/6=60/g}}}.<br>
But the smallest possible measure of the interior angle of a regular polygon is 60 degrees.<br>
ANSWER: The problem as stated is faulty<br>