What is the area of a shape if the perimeter is 16?
We find that r = P/(2π) so A = π(P/(2π))2 = P2/(4π). Any positive area less than this is also possible. So in this problem the largest area possible is (16 in.)2/(4π) = 64/π sq. in.
What is the length of a rectangle with an area of 16cm?
Answer: 144 cm^2 is the answer.
How many rectangles can you draw with a perimeter of 16?
There are 3 different rectangles that can have an area of 16 square units. Use your factors identified to draw on graph paper the 3 rectangles with the factors as the length of each side.
What is the perimeter of a 16cm square?
64 cm
Example 2: Find the perimeter of square whose sides are 16 cm in length. Hence, the perimeter of square is 64 cm.
Where is the Centre of gravity of a rectangle of sides 12cm and 3cm?
Explanation: The centre of gravity of this rectangular area will be half of 3cm from x-axis and half of 12 from the y-axis. therefore the center of gravity will be at (6,1.5).
How many rectangles can be drawn with perimeter of each rectangle as 16 cm take length and breadth as whole numbers?
Otherwise, infinite number of rectangles are possible.
How do you find the length of a perimeter?
The perimeter is the length of the outline of a shape. To find the perimeter of a rectangle or square you have to add the lengths of all the four sides. x is in this case the length of the rectangle while y is the width of the rectangle.
Is the perimeter of a rectangle always 16 units?
Only the perimeter is given as 16. Depending upon the length of sides, the area can can change. Maximum area is when all the sides are equal and in such a situation the area is 16 units. On the other hand when the rectangle is extremely thin, the area is extremely small also.
What is the maximum area of a rectangle?
If a rectangle with perimeter P =16 is a square, then each side = 4 and area = 16 square units. This is the maximum area of the rectangle. For example, find x, y when area =8. x= (8 +/- sqrt [64-32]) divided by 2. = 4 +/- 2 sqrt 2.
What are the parameters for a rectangle calculator?
Input : Two positive real numbers or parameters as the length and width of a rectangle; Output : Three positive real numbers or variables as the perimeter, area and diagonal length of a rectangle and corresponding units after that.
Is it possible for two rectangles to have the same area?
It is possible for two rectangles to have the same area without one of the two numbers that can be both the perimeter and the area of the same rectangle I am assuming that you are seeking the two rectangles that have the area equal to the perimeter. A 4 x 4 square has a perimeter and area of