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To calculate the area of a triangle you need to know its height. To find the height follow these instructions. You must at least have a base to find the height.

Method 1
Method 1 of 3:

Using Base and Area to Find Height

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  1. The formula for the area of a triangle is
    A=1/2bh .
    [1]
    • A = Area of the triangle
    • b = Length of the base of the triangle
    • h = Height of the base of the triangle
  2. You already know the area, so assign that value to A . You should also know the value of one side length; assign that value to "'b'".
    Any side of a triangle can be the base,
    regardless of how the triangle is drawn. To visualize this, just imagine rotating the triangle until the known side length is at the bottom.

    Example
    If you know that the area of a triangle is 20, and one side is 4, then:
    A = 20 and b = 4 .

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  3. First multiply the base (b) by 1/2, then divide the area (A) by the product. The resulting value will be the height of your triangle!

    Example
    20 = 1/2(4)h Plug the numbers into the equation.
    20 = 2h Multiply 4 by 1/2.
    10 = h Divide by 2 to find the value for height.

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Method 2
Method 2 of 3:

Finding an Equilateral Triangle's Height

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  1. An equilateral triangle has three equal sides, and three equal angles that are each 60 degrees. If you
    cut an equilateral triangle in half, you will end up with two congruent right triangles.
    [2]
    • In this example, we will be using an equilateral triangle with side lengths of 8.
  2. Recall the Pythagorean Theorem . The Pythagorean Theorem states that for any right triangle with sides of length a and b , and hypotenuse of length c :
    a 2 + b 2 = c 2 .
    We can use this theorem to find the height of our equilateral triangle! [3]
  3. The hypotenuse c will be equal to the original side length. Side a will be equal to 1/2 the side length, and side b is the height of the triangle that we need to solve.
    • Using our example equilateral triangle with sides of 8, c = 8 and a = 4 .
  4. [4] First square c and a by multiplying each number by itself. Then subtract a 2 from c 2 .

    Example
    4 2 + b 2 = 8 2 Plug in the values for a and c.
    16 + b 2 = 64 Square a and c.
    b 2 = 48 Subtract a 2 from c 2 .

  5. Use the square root function on your calculator to find Sqrt( 2 . The answer is the height of your equilateral triangle!
    • b = Sqrt (48) = 6.93
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Method 3
Method 3 of 3:

Determining Height With Angles and Sides

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  1. The height of a triangle can be found if you have 2 sides and the angle in between them, or all three sides. We'll call the sides of the triangle a, b, and c, and the angles, A, B, and C.
    • If you have all three sides, you'll use
      Heron's formula
      , and the formula for the area of a triangle.
    • If you have two sides and an angle, you'll use the formula for the area given two angles and a side.
      A = 1/2ab(sin C). [5]
  2. Heron's formula has two parts. First, you must find the variable
    s, which is equal to half of the perimeter of the triangle.
    This is done with this formula:
    s = (a+b+c)/2. [6]

    Heron's Formula Example
    For a triangle with sides a = 4, b = 3, and c = 5:
    s = (4+3+5)/2
    s = (12)/2
    s = 6

    Then use the second part of Heron's formula, Area = sqr(s(s-a)(s-b)(s-c). Replace Area in the equation with its equivalent in the area formula: 1/2bh (or 1/2ah or 1/2ch).
    Solve for h. For our example triangle this looks like:
    1/2(3)h = sqr(6(6-4)(6-3)(6-5).
    3/2h = sqr(6(2)(3)(1)
    3/2h = sqr(36)

    Use a calculator to calculate the square root, which in this case makes it 3/2h = 6.
    Therefore, height is equal to 4 , using side b as the base.

  3. Replace area in the formula with its equivalent in the area of a triangle formula: 1/2bh. This gives you a formula that looks like 1/2bh = 1/2ab(sin C). This can be simplified to
    h = a(sin C)
    , thereby eliminating one of the side variables. [7] Note that angle C and side a are both positioned across from the height that you need to find (both on the right side from it, or both on the left side).

    Finding Height with 1 Side and 1 Angle Example
    For example, with a = 3, and C = 40 degrees, the equation looks like this: h = 3(sin 40)
    Use your calculator to finish the equation, which makes h roughly 1.928.

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Community Q&A

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  • Question
    How do I find the area of an equilateral triangle when only the height is given?
    Community Answer
    H = height, S = side, A = area, B = base. You know that each angle is 60 degrees because it is an equilateral triangle. If you look at one of the triangle halves, H/S = sin 60 degrees because S is the longest side (the hypotenuse) and H is across from the 60 degree angle, so now you can find S. The base of the triangle is S because all the sides are the same, so B = S. Using A = (1/2)*BH, you get A = (1/2)*SH, which you can now find.
  • Question
    How do I calculate the height of a right triangle, given only the length of the base and the interior angle at the base?
    Donagan
    Top Answerer
    Look up the tangent of the angle in a trigonometry table. Multiply the tangent by the length of the base.
  • Question
    How do I determine the height of a triangle when I know the length of all three sides?
    Community Answer
    You already know the base, so calculate the area by Heron's formula. Then, substitute the values you know in the formula. Area=1/2 * base * height or height=2 * Area/base and find your answer.
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      About This Article

      Article Summary X

      If you know the base and area of the triangle, you can divide the base by 2, then divide that by the area to find the height. To find the height of an equilateral triangle, use the Pythagorean Theorem, a^2 + b^2 = c^2. Cut the triangle in half down the middle, so that c is equal to the original side length, a equals half of the original side length, and b is the height. Plug a and c into the equation, squaring both of them. Then subtract a^2 from c^2 and take the square root of the difference to find the height. If you want to learn how to calculate the area if you only know the angles and sides, keep reading!

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