The area of a triangle is always half the product of the height and base.

$
Area = \frac{1}{2} (base \cdot height)
$

So which side is the base?

Answer

Any side of the trianglecan be a base. All that matters is that the base and the height must be perpendicular.

Any side can be a base, but every base has only one height. The height is the line from the opposite vertex and perpendicular to the base. The illustration below shows how any leg of the triangle can be a base and the height always extends from the vertex of the opposite side and is perpendicular to the base. Play around with our applet to see how the area of a triangle can be computed from any base/height pairing.

The picture below shows you that the height can actually extend outside of the triangle. So technically the height does not necessarily intersect with the base.

Derivation of the Area of a Triangle from Rectangle

This problems involves 1 small twist. You must decide which of the 3 bases to use. Just remember that base and height are perpendicular. Therefore, the base is '11' since it is perpendicular to the height of 13.4.

To find the area of the triangle on the left, substitute the base and the height into the formula for area.

This problems involves 1 small twist. You must decide which of the 3 bases to use. Just remember that base and height are perpendicular. Therefore, the base is '12' since it is perpendicular to the height of 5.9.

To find the area of the triangle on the left, substitute the base and the height into the formula for area.

Like the last problem, you must decide which of the 3 bases to use. Just remember that base and height are perpendicular. Therefore, the base is '4' since it is perpendicular to the height of 17.7.

To find the area of the triangle on the left, substitute the base and the height into the formula for area.

Again, you must decide which of the 3 bases to use. Just remember that base and height are perpendicular. Therefore, the base is '22' since it is perpendicular to the height of 26.8.

To find the area of the triangle on the left, substitute the base and the height into the formula for area.