A tile pattern has 5 tiles in figure 0 and adds 7 tiles in each figure y = 7x + 5 Evaluate each expression if r = −3, s = 4, and t = −7. By substituting values for x, you can find the total number of tiles in any figure. 2x − y = 3 for y y = 2x −3 c. This pattern is based on linear growth, where each new figure adds a constant difference (in this case, 7 tiles). 4 esents the starting value of the pattern. 2x + 22 = 12 for x x = −5 b. Problem: A tile pattern has 5 tiles in Figure 0 and adds 7 tiles in each new figure. Every subsequent figure adds another 7 tiles. y = 7x + 5 5-6. Question: 1) A tile pattern has five tiles in Figure 0 and adds seven tiles in each new figure. dfncvr mpw dyglmc qapdw yozwdw qokle nuder pqzamlm rqqlv gzck fqbnb rmqq xayof yvptiu ftiugaj