There are infinitely many:
1*22, 5*4.4, 4*5.5 are three examples.
There are often multiple 'correct' dimensions for these problems. The most straight forward way to solve it is to list all the factors that, when multiplied, equal the area. Then from this list, cross out the factors that DON'T equal your perimeter. The remaining factors are your possible dimensions.
7
Give the dimension of each rectangle that can be made from the given number of tiles then use the dimension of the rectangle to list all the given factor pair for each number 24Read more: Give_the_dimension_of_each_rectangle_that_can_be_made_from_the_given_number_of_tiles_then_use_the_dimension_of_the_rectangle_to_list_all_the_given_factor_pair_for_each_number_24_32_48_4560_and_72
Since you are looking at area (30 square inches) it is derived by length times width... simply factor out 30. i.e 1x30, 2x15, 3x10, 5x6 those list all the whols number possibilities
Yes.
There are often multiple 'correct' dimensions for these problems. The most straight forward way to solve it is to list all the factors that, when multiplied, equal the area. Then from this list, cross out the factors that DON'T equal your perimeter. The remaining factors are your possible dimensions.
7
if the perimeter is 12 then the semi perimeter is 6 p=2L+2w 12=2L+2w by division 6=L+w
Its factors are: 1 2 3 4 6 8 12 and 24
Give the dimension of each rectangle that can be made from the given number of tiles then use the dimension of the rectangle to list all the given factor pair for each number 24Read more: Give_the_dimension_of_each_rectangle_that_can_be_made_from_the_given_number_of_tiles_then_use_the_dimension_of_the_rectangle_to_list_all_the_given_factor_pair_for_each_number_24_32_48_4560_and_72
Since you are looking at area (30 square inches) it is derived by length times width... simply factor out 30. i.e 1x30, 2x15, 3x10, 5x6 those list all the whols number possibilities
Yes.
yes
4, 4, 8, 8
Not possible to list them all as there is an infinite number of them!
There are an infinite number of them so it is not possible to list them.
To be perfectly correct about it, a perimeter and an area can never be equal.A perimeter has linear units, while an area has square units.You probably mean that the perimeter and the area are the same number,regardless of the units.It's not possible to list all of the rectangles whose perimeter and area are thesame number, because there are an infinite number of such rectangles.-- Pick any number you want for the length of your rectangle.-- Then make the width equal to (double the length) divided by (the length minus 2).The number of linear units around the perimeter, and the number of square unitsin the area, are now the same number.