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Application of Heron's Formula in Finding Areas of Quadrilaterals Video Lecture - Class 9

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FAQs on Application of Heron's Formula in Finding Areas of Quadrilaterals Video Lecture - Class 9

1. What is Heron's Formula and how is it applied in finding the area of quadrilaterals?
Ans. Heron's Formula is a mathematical formula used to find the area of a triangle when the lengths of its sides are known. To apply Heron's Formula in finding the area of a quadrilateral, we can divide the quadrilateral into two triangles using one of its diagonals. Then, we can calculate the area of each triangle using Heron's Formula and add them together to get the total area of the quadrilateral.
2. Can Heron's Formula be used to find the area of any type of quadrilateral?
Ans. No, Heron's Formula can only be used to find the area of quadrilaterals that can be divided into two triangles using a diagonal. Quadrilaterals that cannot be divided into triangles, such as parallelograms, cannot be solved using Heron's Formula.
3. Are all the sides of the quadrilateral required to apply Heron's Formula?
Ans. No, to apply Heron's Formula in finding the area of a quadrilateral, we only need the lengths of the sides that are part of the triangles formed by a diagonal. The lengths of the other two sides are not necessary.
4. Can Heron's Formula be used to find the area of a quadrilateral with unequal sides?
Ans. Yes, Heron's Formula can be used to find the area of a quadrilateral with unequal sides. As long as the quadrilateral can be divided into two triangles using a diagonal, Heron's Formula can be applied to calculate the area of each triangle and, subsequently, the area of the quadrilateral.
5. Are there any limitations or conditions when using Heron's Formula to find the area of quadrilaterals?
Ans. Yes, there are limitations to using Heron's Formula for finding the area of quadrilaterals. The quadrilateral must be simple, meaning it should not intersect itself. Additionally, the lengths of the sides must satisfy the triangle inequality theorem, which states that the sum of the lengths of any two sides of a triangle must be greater than the length of the third side. If these conditions are not met, Heron's Formula cannot be applied accurately.
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