How to Calculate the Area of a Triangle

Co-authored by David Jia

Last Updated: April 13, 2024 Fact Checked

The most common way to find the area of a triangle is to take half of the base times the height. Numerous other formulas exist, however, for finding the area of a triangle, depending on what information you know. Using information about the sides and angles of a triangle, it is possible to calculate the area without knowing the height.

Method 1

Method 1 of 4:

Using the Base and Height

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1
Find the base and height of the triangle . The base is one side of the triangle. The height is the measure of the tallest point on a triangle. It is found by drawing a perpendicular line from the base to the opposite vertex. This information should be given to you, or you should be able to measure the lengths. ^{[1]
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Research source}
- For example, you might have a triangle with a base measuring 5 cm long, and a height measuring 3 cm long.
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The formula is ${\text{Area}}={\frac {1}{2}}(bh)$ , where $b$ is the length of the triangle’s base, and $h$ is the height of the triangle. ^{[2]
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Research source}

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3
Plug the base and height into the formula. Multiply the two values together, then multiply their product by ${\frac {1}{2}}$ . This will give you the area of the triangle in square units. ^{[3]
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Research source}
- For example, if the base of your triangle is 5 cm and the height is 3 cm, you would calculate:
  ${\text{Area}}={\frac {1}{2}}(bh)$
  ${\text{Area}}={\frac {1}{2}}(5)(3)$
  ${\text{Area}}={\frac {1}{2}}(15)$
  ${\text{Area}}=7.5$
  So, the area of a triangle with a base of 5 cm and a height of 3 cm is 7.5 square centimeters.
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4
Find the area of a right triangle. Since two sides of a right triangle are perpendicular, one of the perpendicular sides will be the height of the triangle. The other side will be the base. So, even if the height and/or base is unstated, you are given them if you know the side lengths. Thus you can use the ${\text{Area}}={\frac {1}{2}}(bh)$ formula to find the area. ^{[4]
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Research source}
- You can also use this formula if you know one side length, plus the length of the hypotenuse . The hypotenuse is the longest side of a right triangle and is opposite the right angle. Remember that you can find a missing side length of a right triangle using the Pythagorean Theorem ( $a^{{2}}+b^{{2}}=c^{{2}}$ ).
- For example, if the hypotenuse of a triangle is side c, the height and base would be the other two sides (a and b). If you know that the hypotenuse is 5 cm, and the base is 4 cm, use the Pythagorean theorem to find the height:
  $a^{{2}}+b^{{2}}=c^{{2}}$
  $a^{{2}}+4^{{2}}=5^{{2}}$
  $a^{{2}}+16=25$
  $a^{{2}}+16-16=25-16$
  $a^{{2}}=9$
  $a=3$
  Now, you can plug the two perpendicular sides (a and b) into the area formula, substituting for the base and height:
  ${\text{Area}}={\frac {1}{2}}(bh)$
  ${\text{Area}}={\frac {1}{2}}(4)(3)$
  ${\text{Area}}={\frac {1}{2}}(12)$
  ${\text{Area}}=6$
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Joseph Meyer is a High School Math Teacher based in Pittsburgh, Pennsylvania. He is an educator at City Charter High School, where he has been teaching for over 7 years. Joseph is also the founder of Sandbox Math, an online learning community dedicated to helping students succeed in Algebra. His site is set apart by its focus on fostering genuine comprehension through step-by-step understanding (instead of just getting the correct final answer), enabling learners to identify and overcome misunderstandings and confidently take on any test they face. He received his MA in Physics from Case Western Reserve University and his BA in Physics from Baldwin Wallace University.

Joseph Meyer
Math Teacher

Use this visual trick to understand the Pythagorean Theorem. Imagine a right triangle with squares constructed on each leg and the hypotenuse. by rearranging the smaller squares within the larger square, the areas of the smaller squares (a² and b²) will add up visually to the area of the larger square (c²).

Method 2

Method 2 of 4:

Using Side Lengths

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1
Calculate the semiperimeter of the triangle. The semi-perimeter of a figure is equal to half its perimeter. To find the semiperimeter, first calculate the perimeter of a triangle by adding up the length of its three sides. Then, multiply by ${\frac {1}{2}}$ . ^{[5]
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- For example, if a triangle has three sides that are 5 cm, 4 cm, and 3 cm long, the semiperimeter is shown by:
  $s={\frac {1}{2}}(3+4+5)$
  $s={\frac {1}{2}}(12)=6$
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The formula is ${\text{Area}}={\sqrt {s(s-a)(s-b)(s-c)}}$ , where $s$ is the semiperimeter of the triangle, and $a$ , $b$ , and $c$ are the side lengths of the triangle. ^{[6]
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3
Plug the semiperimeter and side lengths into the formula. Make sure you substitute the semiperimeter for each instance of $s$ in the formula.
- For example:
  ${\text{Area}}={\sqrt {s(s-a)(s-b)(s-c)}}$
  ${\text{Area}}={\sqrt {6(6-3)(6-4)(6-5)}}$
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4
Calculate the values in parentheses. Subtract the length of each side from the semiperimeter. Then, multiply these three values together. ^{[7]
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Research source}
- For example:
  ${\text{Area}}={\sqrt {6(6-3)(6-4)(6-5)}}$
  ${\text{Area}}={\sqrt {6(3)(2)(1)}}$
  ${\text{Area}}={\sqrt {6(6)}}$
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5
Multiply the two values under the radical sign. Then, find their square root . This will give you the area of the triangle in square units. ^{[8]
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Research source}
- For example:
  ${\text{Area}}={\sqrt {6(6)}}$
  ${\text{Area}}={\sqrt {36}}$
  ${\text{Area}}=6$
  So, the area of the triangle is 6 square centimeters.

Method 3

Method 3 of 4:

Using One Side of an Equilateral Triangle

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1
Find the length of one side of the triangle. An equilateral triangle has three equal side lengths and three equal angle measurements, so if you know the length of one side, you know the length of all three sides. ^{[9]
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- For example, you might have a triangle with three sides that are 6 cm long.
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The formula is ${\text{Area}}=(s^{{2}}){\frac {{\sqrt {3}}}{4}}$ , where $s$ equals the length of one side of the equilateral triangle. ^{[10]
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3
Plug the side length into the formula. Make sure you substitute for the variable $s$ , and then square the value. ^{[11]
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Research source}
- For example if the equilateral triangle has sides that are 6 cm long, you would calculate:
  ${\text{Area}}=(s^{{2}}){\frac {{\sqrt {3}}}{4}}$
  ${\text{Area}}=(6^{{2}}){\frac {{\sqrt {3}}}{4}}$
  ${\text{Area}}=(36){\frac {{\sqrt {3}}}{4}}$
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4
Multiply the square by ${\sqrt {3}}$ . It’s best to use the square root function on your calculator for a more precise answer. Otherwise, you can use 1.732 for the rounded value of ${\sqrt {3}}$ . ^{[12]
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Research source}
- For example:
  ${\text{Area}}=(36){\frac {{\sqrt {3}}}{4}}$
  ${\text{Area}}={\frac {62.352}{4}}$
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5
Divide the product by 4. This will give you the area of the triangle in square units. ^{[13]
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Research source}
- For example:
  ${\text{Area}}={\frac {62.352}{4}}$
  ${\text{Area}}=15.588$
  So, the area of an equilateral triangle with sides 6 cm long is about 15.59 square centimeters.

Method 4

Method 4 of 4:

Using Trigonometry

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1
Find the length of two adjacent sides and the included angle. Adjacent sides are two sides of a triangle that meet at a vertex. ^{[14]
X
Research source} The included angle is the angle between these two sides. ^{[15]
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Research source}
- For example, you might have a triangle with two adjacent sides measuring 150 cm and 231 cm in length. The angle between them is 123 degrees.
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Set up the trigonometry formula for the area of a triangle. The formula is ${\text{Area}}={\frac {bc}{2}}\sin A$ , where $b$ and $c$ are the adjacent sides of the triangle, and $A$ is the angle between them. ^{[16]
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Research source}
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3
Plug the side lengths into the formula. Make sure you substitute for the variables $b$ and $c$ . Multiply their values, then divide by 2. ^{[17]
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Research source}
- For example:
  ${\text{Area}}={\frac {bc}{2}}\sin A$
  ${\text{Area}}={\frac {(150)(231)}{2}}\sin A$
  ${\text{Area}}={\frac {(34,650)}{2}}\sin A$
  ${\text{Area}}=17,325\sin A$
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4
Plug the sine of the angle into the formula. You can find the sine using a scientific calculator by typing in the angle measurement then hitting the “SIN” button.
- For example, the sine of a 123-degree angle is .83867, so the formula will look like this:
  ${\text{Area}}=17,325\sin A$
  ${\text{Area}}=17,325(.83867)$
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5
Multiply the two values. This will give you the area of the triangle in square units.
- For example:
  ${\text{Area}}=17,325(.83867)$
  ${\text{Area}}=14,529.96$ .
  So, the area of the triangle is about 14,530 square centimeters.

Practice Problems

Practice Problems to Calculate the Area of a Triangle

Community Q&A

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Question

How do I find the length and width of a triangle before calculating the area?

Community Answer

It should be included in the problem. If it is a right triangle, use the Pythagorean Theorem (A squared + B squared = C squared) to find the missing side.

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Question

How can I calculate the area of an equilateral triangle?

Community Answer

If you know the base and height, you can use the standard formula A = 1/2bh. If you know the three side lengths, you can use the method for equilateral triangles described in this article.

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Question

How can I find the area of an isosceles right triangle?

Community Answer

The legs must be the sides that are equal, so you just square the length of one of the legs and divide by 2. If you only have the hypotenuse: since isosceles right triangles come in the ratio 1-1-(square root of 2), you just divide the hypotenuse by sqrt(2), square what you get, and divide by 2.

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If you're not exactly sure why the base-height formula works this way, here's a quick explanation. If you make a second, identical triangle and fit the two copies together, it will either form a rectangle (two right triangles) or a parallelogram (two non-right triangles). To find the area of a rectangle or parallelogram, simply multiply base by height. Since a triangle is half of a rectangle or parallelogram, you must therefore solve for half of base times height.

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How to Calculate the Area of a Triangle

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Using the Base and Height

Using Side Lengths

Using One Side of an Equilateral Triangle

Using Trigonometry

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