EXAMPLE 4 Solve a multi-step problem To construct what is known as a fractal tree, begin with a single segment (the trunk) that is 1 unit long, as in Step.

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Presentation transcript:

EXAMPLE 4 Solve a multi-step problem To construct what is known as a fractal tree, begin with a single segment (the trunk) that is 1 unit long, as in Step 0. Add three shorter segments that are unit long to form the first set of branches, as in Step 1. Then continue adding sets of successively shorter branches so that each new set of branches is half the length of the previous set, as in Steps 2 and FRACTAL TREE

EXAMPLE 4 Solve a multi-step problem a. Make a table showing the number of new branches at each step for Steps 1  4. Write the number of new branches as a power of 3. b. How many times greater is the number of new branches added at Step 5 than the number of new branches added at Step 2?

EXAMPLE 4 Solve a multi-step problem a. StepNumber of new branches 13 = = = = 3 4 b. The number of new branches added at Step 5 is 3 5. The number of new branches added at Step 2 is 3 2. So, the number of new branches added at Step 5 is = 3 3 = 27 times the number of new branches added at Step SOLUTION

GUIDED PRACTICE for Example 4 FRACTAL TREE In Example 4, add a column to the table for the length of the new branches at each step. Write the length of the new branches as power of. What is the length of a new branch added at Step 9? SOLUTION ( 1 2 ) 9 = units