Finding the Area of a Triangle

The process of determining the area of a triangle entails the utilization of the equation: 1/2 * base * height. The 'base' refers to any side of the triangle while the 'height' is the vertical distance from the base to the opposing vertex. This equation is universally applicable to all triangle categories.

The problems about Finding the Area of a Triangle

Topic	Problem	Solution
None	(3) 6. The area of a triangle is $12.6 \mathrm{in…	Given the area of the triangle is $12.6\mathrm{in}^{2}$ and the base is $3.5\mathrm{in}$.
None	If $ \mathrm{ABCD} $ is a square of side length…	$ \triangle ABC $ is a right-angled triangle with legs $ AB $ and $ BC $ each of length \( 6 …
None	Area of a triangle is equal to .....of area of a …	$A_{triangle} = \frac{1}{2} \times b \times h_{triangle}$
None	Find the area of the triangle. Round to the neare…	1. Calculate semi-perimeter: $ s = \frac{a+b+c}{2} $
None	i-Ready Area of Triangles and Other Polygons - Qu…	Let height be $h$, then base is $b = h + 3$.

Topic	Problem	Solution
None	(3) 6. The area of a triangle is $12.6 \mathrm{in…	Given the area of the triangle is \(12.6\mathrm{in}^{2}\) and the base is \(3.5\mathrm{in}\).
None	If \( \mathrm{ABCD} \) is a square of side length…	\( \triangle ABC \) is a right-angled triangle with legs \( AB \) and \( BC \) each of length \( 6 …
None	Area of a triangle is equal to .....of area of a …	\(A_{triangle} = \frac{1}{2} \times b \times h_{triangle}\)
None	Find the area of the triangle. Round to the neare…	1. Calculate semi-perimeter: \( s = \frac{a+b+c}{2} \)
None	i-Ready Area of Triangles and Other Polygons - Qu…	Let height be \(h\), then base is \(b = h + 3\).