The perimeter of a polygon with sides of integer length is 45. If the smallest side of the polygon is 5 and the longest side of the polygon is 10, then the number of sides could be any number from?
A. 5 to 7
B. 5 to 8
C. 5 to 9
D. 6 to 8
E. 6 to 9
The OA is B.
I don't have clear this PS question.
I know that the perimeter is the sum of all the sides of the polygon, then
$$P=45=5+10+x_3+x_4+...+x_n$$
But, I don't know how can I get the x values to determine the number of sides.
I appreciate if any expert explain it for me. Thank you so much.
A. 5 to 7
B. 5 to 8
C. 5 to 9
D. 6 to 8
E. 6 to 9
The OA is B.
I don't have clear this PS question.
I know that the perimeter is the sum of all the sides of the polygon, then
$$P=45=5+10+x_3+x_4+...+x_n$$
But, I don't know how can I get the x values to determine the number of sides.
I appreciate if any expert explain it for me. Thank you so much.
