To solve this problem, we need to set up a proportion using the corresponding side lengths of the two similar figures. Let's assume the missing side length is x.
We can set up the proportion as:
(x / 4 yards) = (9.99 yards / 16.92 yards)
To solve for x, we can cross-multiply and divide:
x = (4 yards * 9.99 yards) / 16.92 yards
x ≈ 2.35944 yards
Therefore, the missing side length is approximately 2.35944 yards.
Use proportions to find the missing side length (x) in the two similar figures.%0D%0A%0D%0A(1 point)%0D%0AResponses%0D%0A%0D%0A1.05 yards%0D%0A1.05 yards%0D%0A%0D%0A4 yards %0D%0A4 yards %0D%0A%0D%0A16.92 yards%0D%0A16.92 yards%0D%0A%0D%0A9.99 yards
3 answers
pick one of the options please
Let's choose option 1.05 yards.
To solve this, we need to set up the proportion:
(x / 4 yards) = (1.05 yards / current missing side length)
To find x, we can cross-multiply and solve for it:
x = (4 yards * 1.05 yards) / current missing side length
Now, to find the current missing side length, we can rearrange the equation:
current missing side length = (4 yards * 1.05 yards) / x
Therefore, if the missing side length is 1.05 yards, the current side length would be (4 yards * 1.05 yards) / x.
To solve this, we need to set up the proportion:
(x / 4 yards) = (1.05 yards / current missing side length)
To find x, we can cross-multiply and solve for it:
x = (4 yards * 1.05 yards) / current missing side length
Now, to find the current missing side length, we can rearrange the equation:
current missing side length = (4 yards * 1.05 yards) / x
Therefore, if the missing side length is 1.05 yards, the current side length would be (4 yards * 1.05 yards) / x.
1 answer