This is a problem of sequence and series. You must generalize the rows separately and then you have to generalize the results. For example if you generalized form of that row and substitute n = 3, you get 1. Similarly for all tiles. Find the generalized term of each row and generalize their results. (Some patterns are given in pencil).
This is a problem of sequence and series. You must generalize the rows separately and then you have to generalize the results. For example if you generalized form of that row and substitute n = 3, you get 1. Similarly for all tiles. Find the generalized term of each row and generalize their results. (Some patterns are given in pencil).
Ishayu , 4 Years ago
Grade 11
