Question 1210522
<br>
To me, the wording of the problem clearly states that a point is complete surrounded by...<br>
{{{red(An)}}} equilateral triangle, {{{red(a)}}} regular octagon, {{{red(a)}}} square, {{{red(a)}}} regular pentagon, {{{red(AND)}}} {{{red(a)}}} regular n-gon.<br>
In that case, as hidden in the messy response from the first tutor, there is no solution, since the sum of the interior angles of the triangle, octagon, square, and pentagon is already greater than the required sum of 360 degrees.<br>