An illustration shows a 10 by 10 grid. A non-right triangle is enclosed within the grid. The first vertex at the top of row 2 and the right of column 8. The second vertex is at the top of row 4 and the right of column 1. The third vertex is at the bottom of row 10 and the right of column 8.

Question

An illustration shows a 10 by 10 grid. A non-right triangle is enclosed within the grid. The first vertex at the top of row 2 and the right of column 8. The second vertex is at the top of row 4 and the right of column 1. The third vertex is at the bottom of row 10 and the right of column 8.

What is the area of the non-right triangle? The base and height are found by counting the squares.

Answer 1

To find the area of the non-right triangle, we need to find the base and height of the triangle first.

The base of the triangle is the horizontal distance between the first and third vertices. Counting the squares in each row, we find that the base is 8 squares wide.

The height of the triangle is the vertical distance between the second vertex and the base. Counting the squares in each column, we find that the height is 6 squares tall.

Therefore, the area of the triangle can be calculated using the formula for the area of a triangle:

Area = 1/2 * base * height
Area = 1/2 * 8 * 6
Area = 24 square units

So, the area of the non-right triangle is 24 square units.