Question

Mr. Hall is cleaning up all the pylons after kissing and riding. All of the pylons are the same and they fit inside each other. Just one pylon is 27 cm tall. Each additional pylon adds 5 additional centimeters to the height. What is the height if Mr. Hall has 19 pylons? Create a table of values and find the algebraic expression to solve this problem.

Answer 1

Table of Values:
Number of Pylons: 0 | Height: 27 cm
Number of Pylons: 1 | Height: 32 cm
Number of Pylons: 2 | Height: 37 cm
Number of Pylons: 3 | Height: 42 cm
Number of Pylons: 4 | Height: 47 cm
Number of Pylons: 5 | Height: 52 cm
Number of Pylons: 6 | Height: 57 cm
Number of Pylons: 7 | Height: 62 cm
Number of Pylons: 8 | Height: 67 cm
Number of Pylons: 9 | Height: 72 cm
Number of Pylons: 10 | Height: 77 cm
Number of Pylons: 11 | Height: 82 cm
Number of Pylons: 12 | Height: 87 cm
Number of Pylons: 13 | Height: 92 cm
Number of Pylons: 14 | Height: 97 cm
Number of Pylons: 15 | Height: 102 cm
Number of Pylons: 16 | Height: 107 cm
Number of Pylons: 17 | Height: 112 cm
Number of Pylons: 18 | Height: 117 cm
Number