Trees are planted along a road that is 2 kilometers 50 meters long. Elven trees are planted at an equal distance apart along the road. What is the distance in meters between each tree?

Answers

Answer 1

Answer: Dear Lallenbrett, let's find the kilometers in meters which is 2,050 meters. Since there are 10 spaces in between, we do 2050/10= 250 meters in between each tree.

Answer 2

Answer:

Final answer:

The distance between each tree planted along the 2 kilometers and 50 meters road is 205 meters. This is achieved by dividing the length of the road (2050 meters) by the number of spaces between the trees (10).

Explanation:

To solve this problem, first, we need to understand that a kilometer is equal to 1000 meters. Therefore, 2 kilometers 50 meters is equal to 2050 meters. Given that the 11 trees are planted at an equal distance apart along the 2050 meter road, we would have to divide the total road length by the number of spaces between the trees. The number of spaces is always one less than the number of trees, so we have 11-1 = 10 spaces. Therefore, the distance between each tree is 2050 meters divided by 10, which equals to 205 meters.

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Using a transit, a surveyor measures the angle between two trees to be 111 degrees. If the first tree is 62 feet from the transit and the second tree is 58 feet from the transit, what is the distance between the two trees?

Answers

Answer:

The distance between the two trees is $98.92\ ft$

Step-by-step explanation:

we know that

Applying the law of cosines

$c^(2)=a^(2) +b^(2) -2(a)(b)cos (C)$

where

c -----> is the distance between the two trees

a ----> is the distance between the transit and the first tree

b ----> is the distance between the transit and the second tree

we have

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$b=58\ ft$

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Jeff has 1/2 pizza left in the fridge . at breakfast he ate 1/3 of it. what fraction of the original pizza dose he have left for lunch?

Answers

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Convert into denominators of 6:

3/6 - 2/6 = (3-2)/6 = 1/6

So he will have 1/6 of pizza left for lunch.

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The base of a triangle is 21 inches and the height is 12 inches which of these expressions correctly shows how to calculate the area of a triangle a (21 x 12) divided by 2
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Answers

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So the answer is a

Answer:

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Step-by-step explanation:

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Answers

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Answers

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