4 l on a c = 4 legs on a chair, 4 f on b b is 4 faces on big ben------- so what is 10 p in g
B L P. Miller has written: 'Hydrodynamic drag of roughened circular cylinders'
20 10 in B T the L are G B
p(rectangle)=2*(L+B) =2*(5+3) =16 L=length , B=breath p(rectangle)=2*(L+B) =2*(5+3) =16 L=length , B=breath
four twice inside b and c SL 25 since
10 P on a B A = 10 Pins on a Bowling Ally.
B. P. L. Moore has written: 'Serological and immunological methods' -- subject(s): Analysis, Blood, Immunohematology, Transfusion
b=l-3 P=2l+b 36=2l+b Sub b=l-3 into 36=2l+b 36=2l+b 36=2l+(l-3) 36=2l+l-3 39=3l l=13 cm Sub l=13 into b=l-3. b=l-3 b=13-3 b=10 cm Therefore, the length of each of the two equal sides is 13 cm and the base is qual to 10 cm.
Peremeter is equal to 2 multiply by length + breadth p = 2{ l + b } eg : p = 2 { 6 + 4 } = 2 x 10 = 20
Peremeter is equal to 2 multiply by length + breadth p = 2{ l + b } eg : p = 2 { 6 + 4 } = 2 x 10 = 20
Peremeter is equal to 2 multiply by length + breadth p = 2{ l + b } eg : p = 2 { 6 + 4 } = 2 x 10 = 20
Assuming 96 refers to the area of therectangle, the answer is: infinite. Consider the following sequence of rectangles with breadh B units and length L units.: Breadth = 1 Length = 96. Area = 96, Perimeter = 194 B= 0.1, L = 960. A = 96, P = 1920.2 B = 0.01, L =9600. A = 96, P = 19200.02 B = 0.001, L = 96000. A = 96, P = 192000.002 There is no limit to how small B can get and therefore, how large P can get.