Answer:
Step-by-step explanation:
[tex]\frac{A}{B}:\frac{3}{4}[/tex] and [tex]\frac{B}{C}: \frac{8}{9}[/tex] and we are told that C is 6cm longer than A. That means that C = A + 6.
We are going to cross multiply each one of those ratios. The first one gives us
4A = 3B and the second one gives us
9B = 8C. But since C = A + 6, then
9B = 8(A + 6) and
9B = 8A + 48 and
Now we will solve the first equation above for A:
If 4A = 3B, then
[tex]A=\frac{3}{4}B[/tex] and will use that as a sub for A in the second equation:
[tex]9B=8(\frac{3}{4}B)+48[/tex] and
9B = 6B + 48 and
3B = 48 so
B = 16.
Now that we know B, we can use it to solve for A:
4A = 3(16) and
4A = 48 so
A = 12.
Then we can use that all the way back in the expression we set up for C:
C = A + 6 so
C = 12 + 6 so
C = 18
12 + 16 + 18 is the length of the string: 46cm
