how many segments does a 7 sided figure have joining the midpoints of the sides?

can you show a photo of how this looks cuz i don't understand - pls thanks

so it has 7 segments then?

so the heptagon 7 sided figure has 7 segments joining the midpoint of sides'

is that right?

To determine the number of segments joining the midpoints of the sides of a 7-sided figure, you can use a formula. The formula is given by n(n-1)/2, where n is the number of sides of the figure.

For a 7-sided figure, substituting n = 7 in the formula, we get (7)(7-1)/2 = 7(6)/2 = 42/2 = 21.

Therefore, a 7-sided figure will have 21 segments joining the midpoints of its sides.

Unfortunately, as a text-based AI, I'm unable to display or provide images. However, you can visualize this by drawing a 7-sided figure (a heptagon) and then connecting the midpoints of each adjacent side with line segments.

Here's a picture of a heptagon.

http://www.google.com/imgres?q=7+-+sided+figure&hl=en&sa=X&biw=711&bih=453&tbm=isch&prmd=imvns&tbnid=qEA21YxoB74UQM:&imgrefurl=http://etc.usf.edu/clipart/37300/37383/07-gon_37383.htm&docid=4DaUNiAVllnDTM&imgurl=http://etc.usf.edu/clipart/37300/37383/07-gon_37383_md.gif&w=359&h=350&ei=tVV6T6UCjdWAB43lgOcC&zoom=1&iact=hc&vpx=236&vpy=126&dur=813&hovh=222&hovw=227&tx=116&ty=138&sig=113732492223439297333&page=1&tbnh=97&tbnw=99&start=0&ndsp=10&ved=1t:429,r:1,s:0

Print it and connect the midpoints.