Find Area of A Rectangle With Shortcut

  • Context:
  • Thread starter Thread starter susanto3311
  • Start date Start date
  • Tags Tags
    Area Rectangle
Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
5 replies · 4K views
susanto3311
Messages
73
Reaction score
0
hi all...

how do you find area of a rectangle, if its perimeter of a rectangle is = 72 cm?

i mean how to easy find it without hard work.

do you have a formula or just tricks similar like..

http://calculus-geometry.hubpages.com/hub/How-to-Find-the-Area-Perimeter-and-Diagonal-of-a-Rectangle

thanks in advance...

susanto
 
Mathematics news on Phys.org
For a given perimeter, there are an infinite number of rectangles that will have that perimeter. We need more information about the rectangle.
 
MarkFL said:
For a given perimeter, there are an infinite number of rectangles that will have that perimeter. We need more information about the rectangle.

if perimeter of a rectangle is = 72 cm, counting area of a rectangle =...

i need simple formula to calculate it.
possible?
 
Well, suppose we let the height $0<h<36$ be a free variable, then the base $b$ is $b=36-h$. Thus the area $A$ is:

$$A=bh=(36-h)h$$

Thus we find:

$$0<A\le324$$
 
The sum of the base and the height must be equal to the semi-perimeter, which is 36...half of 72. And the maximum area comes from the base and height being equal. So the upper bound is $18^2=324$.