At point pleasant park, the advanced trail is 3.6 times as long as the medium trail, and the medium trail is 1.2 times as long as the beginner trail. How many times as long as the beginner trail is the advanced trail? Write ur answer as a decimal
To find the length of the advanced trail, we can start with the length of the beginner trail and use the given information to find the length of the advanced trail.
Let's say the length of the beginner trail is B.
According to the given information, the medium trail is 1.2 times as long as the beginner trail. So, the length of the medium trail is 1.2B.
Similarly, the advanced trail is 3.6 times as long as the medium trail. So, the length of the advanced trail is 3.6(1.2B) = 4.32B.
Therefore, the advanced trail is 4.32 times as long as the beginner trail.
Answer: 4.32
To find out how many times as long the advanced trail is compared to the beginner trail, we need to multiply the lengths of all the trails.
Let's assume the length of the beginner trail is 1 unit.
According to the given information, the medium trail is 1.2 times as long as the beginner trail. So, the length of the medium trail would be 1 x 1.2 = 1.2 units.
Similarly, the advanced trail is 3.6 times as long as the medium trail. So, the length of the advanced trail would be 1.2 x 3.6 = 4.32 units.
Therefore, the advanced trail is 4.32 times as long as the beginner trail.
To find out how many times longer the advanced trail is compared to the beginner trail, we need to go step by step.
Let's say the length of the beginner trail is "x".
According to the given information, the medium trail is 1.2 times as long as the beginner trail. So, the length of the medium trail would be 1.2 * x.
Similarly, the advanced trail is 3.6 times as long as the medium trail. So, the length of the advanced trail would be 3.6 * (1.2 * x).
To find out how many times longer the advanced trail is compared to the beginner trail, we need to divide the length of the advanced trail by the length of the beginner trail:
(3.6 * (1.2 * x)) / x
Simplifying this expression, we can cancel out the "x" terms:
(3.6 * 1.2)
Calculating this expression:
3.6 * 1.2 = 4.32
Therefore, the advanced trail is 4.32 times as long as the beginner trail.