Sentence examples for formula of finding from inspiring English sources

Since a regular hexagon is comprised of six equilateral triangles, the formula for finding the area of a hexagon is derived from the formula of finding the area of an equilateral triangle.

You can think of the formula for finding the vertex of a quadratic function as being (x, y) = [ -b/2a), f(-b/2a)].

Now, all you have to do is plug the dimensions of each shape into the formula for finding the surface area of each shape and you're all done.

Plug the sums into the formula for finding the magnitude of a force: sqrt((Fx_total)^2 + (Fy_total)^2) to find the net force.

2 and 3 are both in the middle, so you need to add 2 and 3, then divide the sum by 2. The formula for finding the average of two numbers is (the sum of the two middle numbers) ÷ 2. Finished.

Since you're finding the area of a semi-circle, you'll be looking for half of the area of a circle, which means you have to use the formula for finding the area of a semi-circle and then divide it by two.

The formula for finding the x-value of the vertex of a quadratic equation is x = -b/2a.

The general formula for finding the area of a triangle is area = ½ × base × height which is also equal to area = ½ × a × b × sin C. The choice of which angle is which in all of these equations is of course completely arbitrary, so feel free to swap around a, b and c at will, as long as you also swap A, B and C to make them fit.

Firstly, an iteration formula for finding the solution of the algebraic equation f ( x ) = 0 can be constructed as x n + 1 = x n + λ f ( x n ).

The basic recursion formula for finding the path of maximum weight is as follows: TotalWeight ⁡ (v m ) = max ⁡ v n ∈ Out ⁡ (v m ) (TotalWeight ⁡ (v n ) + Weight ⁡ (v m ) ), where v n, v m ∈ V3 and Out(v m ) is the set of vertices in which the out-edges of v m enter.

The formula for finding the area of a circle is The formula for finding the area of a circle is Multiply the radius by itself to square it.