Heptagon has unequal sides and each side is 2 more than twice the side of the smaller one before it.
Heptagon is a 2 dimensional geometric shape that has got 7 sides.
Lets say the length of smallest side is 'x' units.
Length of the second side will be 2 more than twice the smaller side so the side length will be:
[tex]2\times x+2=2x+2[/tex]
Now the length of the third side will be 2 more than twice the second side that is:
[tex]2(2 \times x+2)+2=2(2x+2)+2=4x+4+2=4x+6[/tex]
Similarly, length of the fourth side will be:
[tex]2(4x+6)+2=8x+12+2=8x+14[/tex]
Similarly, length of the fifth side will be:
[tex]2(8x+14)+2=16x+28+2=16x+30[/tex]
Again, length of the sixth side will be
[tex]2(16x+30)+2=32x+60+2=32x+62[/tex]
And the length of the seventh side will be
[tex]2(32x+62)+2=64x+124+2=64x+126[/tex]
Now, perimeter of any geometric shape is the sum of the lengths of the sides:
Adding all the sides we get:
[tex]x+(2x+2)+(4x+6)+(8x+14)+(16x+30)+(32x+62)+(64x+126)[/tex]
[tex]=x+2x+2+4x+6+8x+14+16x+30+32x+62+64x+126[/tex]
[tex]=127x+240[/tex]
Therefore, the expression for the perimeter of the required heptagon is [tex]127x+240[/tex].
