ArticlesMath ArticlesArea of Triangles with 3 Sides

Area of Triangles with 3 Sides

A triangle is a polygon with three edges and three vertices. It is one of the basic shapes in geometry. A triangle with vertices A, B, and C.The length of the sides of a triangle may be same or different. If all the 3 sides of a triangle are equal, then it is an equilateral triangle. If 2 sides of a triangle are equal, it is an isosceles triangle.

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    What is the Perimeter of a triangle?

    The Perimeter of a triangle is the total length around the triangle. Consider a triangle with sides of lengths ‘a’, ‘b’, and ‘c’.

    Perimeter of triangle

    Thus, the perimeter of the triangle = a + b + c.

    What is the Base and Height of a triangle?

    The Base of a triangle is the side on which the triangle rests. Any one of the three sides of the triangle can be considered as the base. The perpendicular drawn from a base to the opposite vertex of a triangle is known as the corresponding Height of the triangle.

    Base and Height of a triangle

    For the above triangles, ℎ1 is the corresponding height of base b1, ℎ2 is the corresponding height of base b2, ℎ3 is the corresponding height of base b3.

    What is the Area of a triangle?

    • To find the area of the triangle, a base and its corresponding height are considered. Consider a triangle with base ‘b’ and corresponding height ‘h’.

    area of triangle

    Then, the area of the triangle = ½ × b × ℎ

    That is, area of a triangle is ½ times the product of its base and the corresponding height.

    • If the height and base of a triangle is not given and the lengths of all three sides of the triangle are known, Heron’s formula can be used to calculate the area. Heron’s formula is a general formula for calculating the area of any triangle using the lengths of its sides.

    Heron’s Formula: Let’s say the lengths of the three sides of the triangle are a, b, and c.

    The semi-perimeter (s) of the triangle is calculated as (a + b + c) / 2.

    Then, the area (A) of the triangle can be found using the formula:

    A = √(s x (s – a) x (s – b) x (s – c))

    Area of Triangle with 3 Sides Formula

    The area of a triangle with three sides was first discovered by the Greek mathematician Heron of Alexandria. He created a formula that allows us to find the area of a triangle without needing to know the angles or any other distances, just the lengths of its sides.

    Let ABC be a triangle such that the length of the 3 sides of the triangle is AB = c, BC = a and CA = b.

    The semi-perimeter of triangle ABC = s = (a + b + c)/2

    Then, the area of triangle ABC = √[s × (s – a) × (s – b) × (s – c)].

    How is the formula to find the area of a triangle obtained?

    Consider a triangle as shown below:

    area of a triangle

    If the base and the corresponding height of this triangle are b and h respectively, then the area of this triangle is 1/2 × b × ℎ. Let us verify this using the following steps.

    • Step 1: Consider a copy of the same triangle along with the original one. Since, both the triangles are congruent, they will have the same area.
    • Step 2: The second triangle is flipped horizontally and then vertically, it will be as shown below.

    Triangles

    • Step 3: Combining these two triangles, we give us a quadrilateral as shown below.

    quadrilateral

    The area of this quadrilateral will be the sum of the areas of the two triangles. But areas of both the triangles are the same.

    So, Area of the quadrilateral = 2 x Area of a triangle. … (i)

    • Step 4: Now, the quadrilateral is fragmented as shown below

    quadrilaterals

    Area of rectangle = L x B

    So, area of rectangle = b x h …. (ii)

    Also, the area of the rectangle = area of the quadrilateral from step 3 ….. (iii)

    From (i), (ii), and (iii),

    2 x Area of triangle = b x h

    Hence, Area of triangle = ½ × b × ℎ

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    Solved Examples on Area of Triangles with 3 Sides

    Example 1. If the base and the corresponding height of a triangle is 10 cm and 4 cm respectively, then its area is given by,

    Solution: Area of the Triangles = 1/2 x b x h

    = 1/2 x 10 x 4

    = 1/2 x 40

    = 20 cm2

    So, the area of the triangle is 20𝑐𝑚2.

    Solved Examples on Area of Triangle with 3 Sides

    Question 1 Find the area of a triangle with sides of lengths 7 cm, 8 cm, and 9 cm.

    Solution:

    1. Identify the side lengths:

      a=7cm,b=8cm,c=9cma = 7 \, \text{cm}, \, b = 8 \, \text{cm}, \, c = 9 \, \text{cm}

    2. Calculate the semi-perimeter (s):

      s=(a+b+c)2=(7+8+9)2=242=12cms = \frac{(a + b + c)}{2} = \frac{(7 + 8 + 9)}{2} = \frac{24}{2} = 12 \, \text{cm}

    3. Use Heron’s formula to find the area:

      Area=s×(sa)×(sb)×(sc)\text{Area} = \sqrt{s \times (s – a) \times (s – b) \times (s – c)}

      =12×(127)×(128)×(129)= \sqrt{12 \times (12 – 7) \times (12 – 8) \times (12 – 9)}

      =12×5×4×3=72026.83cm2= \sqrt{12 \times 5 \times 4 \times 3} = \sqrt{720} \approx 26.83 \, \text{cm}^2

    Question 2 A triangle has side lengths of 5 m, 12 m, and 13 m. Calculate its area.

    Solution:

    1. Identify the side lengths:

      a=5m,b=12m,c=13ma = 5 \, \text{m}, \, b = 12 \, \text{m}, \, c = 13 \, \text{m}

    2. Calculate the semi-perimeter (s):

      s=(5+12+13)2=302=15ms = \frac{(5 + 12 + 13)}{2} = \frac{30}{2} = 15 \, \text{m}

    3. Use Heron’s formula:

      Area=15×(155)×(1512)×(1513)\text{Area} = \sqrt{15 \times (15 – 5) \times (15 – 12) \times (15 – 13)}

      =15×10×3×2=900=30m2= \sqrt{15 \times 10 \times 3 \times 2} = \sqrt{900} = 30 \, \text{m}^2

    Question 3 Calculate the area of a triangle with sides measuring 10 cm, 14 cm, and 16 cm.

    Solution:

    1. Identify the side lengths:

      a=10cm,b=14cm,c=16cma = 10 \, \text{cm}, \, b = 14 \, \text{cm}, \, c = 16 \, \text{cm}

    2. Calculate the semi-perimeter (s):

      s=(10+14+16)2=402=20cms = \frac{(10 + 14 + 16)}{2} = \frac{40}{2} = 20 \, \text{cm}

    3. Use Heron’s formula:

      Area=20×(2010)×(2014)×(2016)\text{Area} = \sqrt{20 \times (20 – 10) \times (20 – 14) \times (20 – 16)}

      =20×10×6×4=480069.28cm2= \sqrt{20 \times 10 \times 6 \times 4} = \sqrt{4800} \approx 69.28 \, \text{cm}^2

    Question 4 A triangle has side lengths of 9 in, 40 in, and 41 in. Find its area.

    Solution:

    1. Identify the side lengths:

      a=9in,b=40in,c=41ina = 9 \, \text{in}, \, b = 40 \, \text{in}, \, c = 41 \, \text{in}

    2. Calculate the semi-perimeter (s):

      s=(9+40+41)2=902=45ins = \frac{(9 + 40 + 41)}{2} = \frac{90}{2} = 45 \, \text{in}

    3. Use Heron’s formula:

      Area=45×(459)×(4540)×(4541)\text{Area} = \sqrt{45 \times (45 – 9) \times (45 – 40) \times (45 – 41)}

      =45×36×5×4=8100=90in2= \sqrt{45 \times 36 \times 5 \times 4} = \sqrt{8100} = 90 \, \text{in}^2

    FAQs on Area of Triangles with 3 Side

    How can I find the length of an unknown side in a triangle?

    To find the length of an unknown side in a triangle, you can use various formulas, such as the Pythagorean Theorem for right triangles or the law of cosines for non-right triangles. The specific formula used depends on the information given, such as the lengths of other sides and angles of the triangle.

    How can I find the angles of a triangle if I know the lengths of its sides?

    To find the angles of a triangle when the lengths of its sides are known, you can use the law of cosines or the law of sines. The law of cosines is applicable to all triangles, while the law of sines is specifically useful for solving triangles that are not right triangles.

    What is the perimeter of a triangle and how do I calculate it?

    he perimeter of a triangle is the sum of the lengths of its three sides. To calculate the perimeter, you simply add up the lengths of the three sides.

    Can I find the area of a triangle without knowing its height?

    Yes, you can find the area of a triangle without knowing its height if you have the lengths of its sides. By using Heron's formula, you can calculate the area based on the lengths of the sides alone, without explicitly needing the height.

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