# What is the perimerter of a hexagon with 3.25 m sides?

6*3.25 = 19.5 m

### How do you work out the area a regular hexagon?

If all the vertices of the regular hexagon are joined to the centre of the hexagon, 6 equilateral triangles are created: the area of the hexagon is 6 times the area of one of these triangles. If the length of the side of the hexagon is m, then the length of each of the sides of these triangles is also m. Using Pythagoras the height of these triangles can be found to be m x…

### Is oxycodone hcl 5 mg tablet with a m on the front and 05 52 on the back of the tablet as strong as ic oxycodone apap 5-325?

The tablet with the M in the square and/or 05 52 or 5 on the other side on the top half of the hyphen is the same as the oxycodone apap 5-325. The only difference is that the 325 in the apap tablet is acetaminophen or Tylenol. The tablets with M on them can be injected whereas the 5-325 can be taken, crushed, snorted but not injected because of the Tylenol in the tablet.

### Find m and n if GCD if 325 and 858 is m325 plus n858?

This is my method to find GCD of 2 big numbers A and B and expressing that gcd of the form mA + nB First, let us find the gcd. Let us call it as d 1) Divide the bigger number by the smaller one. 2) Divide the smaller number by the remainder u get in step 1. 3) Divide the step 1 remainder by step 2, then each remainder by the next remainder and…

### What has 200 cubic meter capacity?

There are lots of possible answers. One is a cuboid with sides of length 5 m, 5 m and 8 m. Another is a cuboid with sides of 1 mm, 1 mm, and 200,000 kilometres. Or a sphere with a radius of approx 3.63 metres. There are lots of possible answers. One is a cuboid with sides of length 5 m, 5 m and 8 m. Another is a cuboid with sides of 1 mm…

### Side of a regular hexagon is 6cm .Find the area of hexagon?

Let the vertices of the hexagon be A, B, C, D, E and F. Join AD, BE and CF. These lines intersect at point M. The external angle of a hexagon =360/6 =60° . The corresponding internal angle is 120°. The lines drawn bisect the internal angle at each vertex. The angles of ∆ABM are 60°, 60° and thus the angle at M is also 60° - the triangle is therefore equilateral with a side…