The length of the aqueduct is 13 km.
My reasoning for this is because the inner triangle is in perfect ratio to the outer triangle and the inner edge has a ratio of 1 to 5 so if you’re searching for the length of the aqueduct you would multiply the corresponding side which is 2.6 km x 5 to which you would get 13
Answer:
10x+10y
Step-by-step explanation:
6(x+2y)-2(y-2x)
=6x+12y-2y+4x
=10x+10y
Answer:
this to long
Step-by-step explanation:
no... ................
(2+1)+3=2+(2+2)
Any two numbers that add to 4.
Answer:
Step-by-step explanation:
https://web.gccaz.edu/~johwd63181/MAT142/chapter_1/solutions/section%201.4%20solutions.pdf