The height of an equilateral triangle equals √3/2 times the side length. Using 7/4 for the square root of 3, what is the approximate height in meters of an equilateral triangle with a side length of 12 meters?
The height of an equilateral triangle is given by the formula:
height = (√3/2) * side length
Using the given value for √3, we can substitute in the values:
height = (7/4) * 12
Simplifying:
height = 7 * 12 / 4
height = 84 / 4
height = 21
Therefore, the approximate height of an equilateral triangle with a side length of 12 meters is 21 meters.
To find the approximate height in meters of an equilateral triangle with a side length of 12 meters, we can use the formula: height = (√3/2) x side length.
Given that √3 ≈ 7/4, we can substitute this value into the formula:
height ≈ (7/4) x (12)
Calculating this, we get:
height ≈ (7 x 12) / 4
height ≈ 84 / 4
height ≈ 21 meters
Therefore, the approximate height of the equilateral triangle is 21 meters.
To find the approximate height of an equilateral triangle, you need to multiply the square root of 3/2 by the side length. Given that 7/4 is the approximate value for the square root of 3, we can substitute this value into the formula.
First, let's calculate the approximate height by multiplying the side length by the approximate value for the square root of 3/2:
Height = (Approximate value for the square root of 3/2) * (Side length)
= (7/4) * (12)
Let's calculate this:
Height = (7/4) * (12)
= 84/4
= 21
Therefore, the approximate height of the equilateral triangle with a side length of 12 meters is 21 meters.