4(3^3*x^(2*3)y^(4*3)/2^4x^(3*4)y^(5*4)
108x^6y^12/16x^12y^20
on the top (numerator): 27
on the bottom (denominator): 4x^6y^8
Given:
hexagon
apothem of the hexagon: 14 cm
perimeter of the hexagon: 96 cm
Area of the hexagon = [(3√3) / 2] a² ; where a is the measure of the side
hexagon has 6 sides.
Perimeter = 6a
96 cm = 6a
96 cm / 6 = a
16 = a
We can also use the area of a triangle to approximate the area of the hexagon. There are 6 triangles in the hexagon .
Area of a triangle = (height * base) / 2
A = (14 cm * 16 cm) / 2
A = 224 / 2
A = 112 cm²
112 cm² * 6 triangles = 672 cm²
In Point form: (6,-3)
In Equation form: x = 6, y = -3
Step-By-Step:
Solve for the first variable in one of the equations, then subsititute the result into the other equation