Answered
A closed rectangular box has dimensions of length n inches, width n+4 inches, and height n+5 inches. Write a polynomial function A(n) A ( n ) A(n) for the area of the largest side of the box if dimensions increase by 6 inches.
A) A(n) =n2+4n−116A ( n ) = n ^ { 2 } + 4 n - 116A(n) =n2+4n−116
B) A(n) =n2−11n+110A ( n ) = n ^ { 2 } - 11 n + 110A(n) =n2−11n+110
C) A(n) =n2+4n+110A ( n ) = n ^ { 2 } + 4 n + 110A(n) =n2+4n+110
D) A(n) =n2+21n+110A ( n ) = n ^ { 2 } + 21 n + 110A(n) =n2+21n+110
E) A(n) =n2+11n+110A ( n ) = n ^ { 2 } + 11 n + 110A(n) =n2+11n+110
On Sep 23, 2024