[size=150]A Sierpinski triangle can be created by starting with an equilateral triangle, breaking the triangle into 4 congruent equilateral triangles, and then removing the middle triangle. Starting from a single black equilateral triangle with an area of 256 square inches, here are the first four steps:[/size][br][img]data:image/png;base64,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[/img]
How are these graphs the same?
Starting with the number 10, build a sequence of 5 numbers.[br]
Starting with the number 1, build a sequence of 5 numbers.[br]
Select a different starting number and build a sequence of 5 numbers.[br]
Give a rule the sequence could follow and the next 3 terms.[br]
Give a [i]different[/i] rule the sequence could follow and the next 3 terms.[br]