Answer: 17 in.
Step-by-step explanation:
The sides of an equilateral triangle measure 16 inches. The midpoints of the sides of the triangle are joined to form another equilateral triangle with sides that are half the length of the outer triangle. This process is continued until three triangles are inscribed in the first triangle. The sum of the perimeters of all four triangles is 17 in.
Answer with explanation:
⇒Side of largest equilateral triangle in which three equilateral triangles are inscribed = 16 inches
Perimeter of a triangle = Sum of three sides of triangle
Perimeter of equilateral triangle having side length 16 inches = 16 +16+16=48 inches
⇒→Second equilateral triangle which is inscribed in this equilateral triangle having side length half of that equilateral triangle in which it is inscribed
[tex]=\frac{16}{2}\\\\=8[/tex] inches
Perimeter of equilateral triangle having side length 8 inches = 8 +8+8=24 inches
⇒→Third equilateral triangle which is inscribed in this equilateral triangle having side length half of that equilateral triangle in which it is inscribed
[tex]=\frac{8}{2}\\\\=4[/tex] inches
Perimeter of equilateral triangle having side length 4 inches =4+4+4=12 inches
⇒→Fourth equilateral triangle which is inscribed in this equilateral triangle having side length half of that equilateral triangle in which it is inscribed
[tex]=\frac{4}{2}\\\\=2[/tex] inches
Perimeter of equilateral triangle having side length 2 inches =2+2+2=6 inches
→≡Total Perimeter of all four Equilateral Triangle
=48 +24+12+6
= 90 inches
