stuttgart high school math rocks! · 2018. 3. 30. · 2 103 log 542 2 2103 5. make a conjecture for...

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Page 1: STUTTGART HIGH SCHOOL MATH ROCKS! · 2018. 3. 30. · 2 103 log 542 2 2103 5. Make a conjecture for a logarithm of the form log(xyz), where x, y, and z are positive real numbers

Page 2: STUTTGART HIGH SCHOOL MATH ROCKS! · 2018. 3. 30. · 2 103 log 542 2 2103 5. Make a conjecture for a logarithm of the form log(xyz), where x, y, and z are positive real numbers

Page 3: STUTTGART HIGH SCHOOL MATH ROCKS! · 2018. 3. 30. · 2 103 log 542 2 2103 5. Make a conjecture for a logarithm of the form log(xyz), where x, y, and z are positive real numbers

Page 4: STUTTGART HIGH SCHOOL MATH ROCKS! · 2018. 3. 30. · 2 103 log 542 2 2103 5. Make a conjecture for a logarithm of the form log(xyz), where x, y, and z are positive real numbers

Page 5: STUTTGART HIGH SCHOOL MATH ROCKS! · 2018. 3. 30. · 2 103 log 542 2 2103 5. Make a conjecture for a logarithm of the form log(xyz), where x, y, and z are positive real numbers

Page 6: STUTTGART HIGH SCHOOL MATH ROCKS! · 2018. 3. 30. · 2 103 log 542 2 2103 5. Make a conjecture for a logarithm of the form log(xyz), where x, y, and z are positive real numbers

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